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The integral Hodge conjecture for two-dimensional Calabi–Yau categories

Published online by Cambridge University Press:  12 April 2022

Alexander Perry*
Affiliation:
Department of Mathematics, University of Michigan, Ann Arbor, MI48109, [email protected]
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Abstract

We formulate a version of the integral Hodge conjecture for categories, prove the conjecture for two-dimensional Calabi–Yau categories which are suitably deformation equivalent to the derived category of a K3 or abelian surface, and use this to deduce cases of the usual integral Hodge conjecture for varieties. Along the way, we prove a version of the variational integral Hodge conjecture for families of two-dimensional Calabi–Yau categories, as well as a general smoothness result for relative moduli spaces of objects in such families. Our machinery also has applications to the structure of intermediate Jacobians, such as a criterion in terms of derived categories for when they split as a sum of Jacobians of curves.

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Research Article
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This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (https://creativecommons.org/licenses/by/4.0), which permits unrestricted re-use, distribution, and reproduction in any medium, provided the original work is properly cited. Compositio Mathematica is © Foundation Compositio Mathematica.
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1. Introduction

Let $X$ be a smooth projective complex variety. The Hodge conjecture in degree $n$ for $X$ states that the subspace of Hodge classes in $\mathrm {H}^{2n}(X, \mathbf {Q})$ is generated over $\mathbf {Q}$ by the classes of algebraic cycles of codimension $n$ on $X$. This conjecture holds for $n = 0$ and $n = \dim (X)$ for trivial reasons, for $n=1$ by the Lefschetz $(1,1)$ theorem, and for $n = \dim (X) - 1$ by the case $n = 1$ and the hard Lefschetz theorem. In all other degrees, the conjecture is far from being known in general, and is one of the deepest open problems in algebraic geometry.

There is an integral refinement of the conjecture, which is in fact the version originally proposed by Hodge [Reference HodgeHod52]. Let $\operatorname {Hdg}^{n}(X, \mathbf {Z}) \subset \mathrm {H}^{2n}(X, \mathbf {Z})$ denote the subgroup of integral Hodge classes, consisting of cohomology classes whose image in $\mathrm {H}^{2n}(X, \mathbf {C})$ is of type $(n,n)$ for the Hodge decomposition. Then the cycle class map $\operatorname {CH}^{n}(X) \to \mathrm {H}^{2n}(X, \mathbf {Z})$ factors through $\operatorname {Hdg}^{n}(X, \mathbf {Z})$. The integral Hodge conjecture in degree $n$ states that the image of this map is precisely $\operatorname {Hdg}^{n}(X, \mathbf {Z})$. This implies the rational version from above, and is known for $n = 0, 1, \dim (X)$ for the same reasons. However, in all other degrees, the integral Hodge conjecture is false in general. Indeed, Atiyah and Hirzebruch constructed the first of many counterexamples [Reference Atiyah and HirzebruchAH62, Reference Ballico, Catanese and CilibertoBCC92, Reference Soulé and VoisinSV05, Reference Colliot-Thélène and VoisinCV12, Reference TotaroTot13, Reference SchreiederSch19b, Reference Benoist and OttemBO20] showing that Hodge's original hope is quite far from being true.

The failure of the integral Hodge conjecture is measured by the cokernel $\mathrm {V}^{n}(X)$ of the map $\operatorname {CH}^{n}(X) \to \operatorname {Hdg}^{n}(X, \mathbf {Z})$, which we call the degree $n$ Voisin group of $X$. This is a finitely generated abelian group, predicted to be finite by the Hodge conjecture. The group $\mathrm {V}^{n}(X)$ is especially interesting for $n = 2$ or $n = \dim (X) - 1$ because then it is birationally invariant, as observed by Voisin [Reference Soulé and VoisinSV05]. In particular, for rational varieties $\mathrm {V}^{n}(X)$ vanishes in these degrees, that is, the integral Hodge conjecture holds. This is the first in a line of results which show that, despite the counterexamples mentioned above, the integral Hodge conjecture may hold under interesting geometric conditions. For instance, for $n = 2$ the conjecture is known if $X$ is a threefold of negative Kodaira dimension or of Kodaira dimension $0$ with $\mathrm {H}^{0}(X, K_X) \neq 0$ [Reference VoisinVoi06, Reference TotaroTot21], a fibration in quadrics over a surface [Reference Colliot-Thélène and VoisinCV12], or a fibration in at worst nodal cubic threefolds over a curve [Reference VoisinVoi13]. For $n = \dim (X) - 1$, the conjecture is known if $X$ is a Fano fourfold [Reference Höring and VoisinHV11], a Fano variety of index $\dim (X) - 3$ and $\dim (X) = 5$ or $\dim (X) \geq 8$ [Reference Höring and VoisinHV11, Reference FlorisFlo13], or a hyperkähler variety of K3$^{[n]}$ or generalized Kummer type [Reference Mongardi and OttemMO20].

We highlight two general questions suggested by these results.

  • When does the integral Hodge conjecture hold for varieties with $K_X = 0$?

  • When does the integral Hodge conjecture hold in degree $2$ for Fano fourfolds?

The second question is of particular importance because its failure obstructs rationality. The main goal of this paper is to give a positive answer to the first question for certain ‘noncommutative surfaces’, and to use this to provide positive answers to the second question for interesting examples. To do so, we develop Hodge theory for suitable categories, introduce a technique involving moduli spaces of objects in categories to prove the integral Hodge conjecture, and prove a smoothness result for such moduli spaces in the two-dimensional Calabi–Yau case that also has applications to hyperkähler geometry. Our Hodge-theoretic apparatus for categories can also be applied to questions about the odd-degree cohomology of varieties, such as when an intermediate Jacobian splits as a sum of Jacobians of curves.

1.1 The integral Hodge conjecture for categories

We will be concerned with an analogue of the above story for a ‘noncommutative smooth proper complex variety’, that is, an admissible subcategory $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ of the derived category of a smooth proper complex variety $X$. For any such $\mathcal {C}$, we show that the (the zeroth homotopy group of) Blanc's topological K-theory [Reference BlancBla16] gives a finitely generated abelian group $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$ which is equipped with a canonical weight $0$ Hodge structure, whose Hodge decomposition is given in terms of Hochschild homology. Moreover, the natural map from the Grothendieck group $\mathrm {K}_0(\mathcal {C}) \to \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$ factors through the subgroup $\operatorname {Hdg}(\mathcal {C}, \mathbf {Z}) \subset \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$ of integral Hodge classes. The integral Hodge conjecture for $\mathcal {C}$ then states that the map $\mathrm {K}_0(\mathcal {C}) \to \operatorname {Hdg}(\mathcal {C}, \mathbf {Z})$ is surjective, while the Hodge conjecture for $\mathcal {C}$ states that this is true after tensoring with $\mathbf {Q}$.

When $\mathcal {C} = \operatorname {D_{{perf}}}(X)$, after tensoring with $\mathbf {Q}$ the construction $\mathrm {K}_0(\mathcal {C}) \to \operatorname {Hdg}(\mathcal {C}, \mathbf {Z})$ recovers the usual cycle class map $\operatorname {CH}^{*}(X) \otimes \mathbf {Q} \to \operatorname {Hdg}^{*}(X, \mathbf {Q})$ to the group of rational Hodge classes of all degrees. Therefore, the Hodge conjecture in all degrees for $X$ is equivalent to the Hodge conjecture for $\operatorname {D_{{perf}}}(X)$. The integral Hodge conjectures for $X$ and $\operatorname {D_{{perf}}}(X)$ are more subtly, but still very closely, related (Proposition 5.16).

The key motivating example for us is the Kuznetsov component $\mathcal {K}u(X) \subset \operatorname {D_{{perf}}}(X)$ of a cubic fourfold $X \subset \mathbf {P}^{5}$, defined by the semiorthogonal decomposition

\[ \operatorname{D_{{perf}}}(X) = \left \langle \mathcal {K}u(X) , \mathcal{O}_X, \mathcal{O}_X(1), \mathcal{O}_X(2) \right \rangle. \]

Kuznetsov [Reference KuznetsovKuz10] proved that $\mathcal {K}u(X)$ is a two-dimensional Calabi–Yau (CY2) category, that is, $\mathcal {K}u(X)$ satisfies Serre duality in the form

\[ \operatorname{Ext}^{i}(E, F) \cong \operatorname{Ext}^{2-i}(F, E)^{\scriptscriptstyle\vee} \quad \text{for} \ E, F \in \mathcal {K}u(X), \]

and is connected in the sense that its zeroth Hochschild cohomology is one-dimensional. The simplest example of a CY2 category is $\operatorname {D_{{perf}}}(T)$ where $T$ is a K3 or abelian surface, or more generally the twisted derived category $\operatorname {D_{{perf}}}(T, \alpha )$ for a Brauer class $\alpha \in \operatorname {Br}(T)$. Kuznetsov proved that for special $X$ the category $\mathcal {K}u(X)$ is equivalent to such an example, while by [Reference Addington and ThomasAT14] no such equivalence exists for very general $X$. Since then a number of further CY2 categories have been discovered (see § 6.2), the next most studied being the Kuznetsov component of a Gushel–Mukai (GM) fourfold (a Fano fourfold that generically can be written as the intersection of the Grassmannian $\mathrm {Gr}(2,5)$ with a hyperplane and a quadric). Recently, CY2 categories have attracted a great deal of attention due to their connections to birational geometry, Hodge theory, and the construction of hyperkähler varieties [Reference Addington and ThomasAT14, Reference HuybrechtsHuy17, Reference Huybrechts and RennemoHR19, Reference Bayer, Lahoz, Macrì and StellariBLMS22, Reference Li, Pertusi and ZhaoLPZ20, Reference Bayer, Lahoz, Macrì, Nuer, Perry and StellariBLM+21, Reference Kuznetsov and PerryKuPe18, Reference Perry, Pertusi and ZhaoPPZ19].

Inspired by work of Addington and Thomas [Reference Addington and ThomasAT14], for any CY2 category $\mathcal {C}$ we define the Mukai Hodge structure $\widetilde {\mathrm {H}}(\mathcal {C}, \mathbf {Z})$ as the weight $2$ Tate twist of $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$. The group $\widetilde {\mathrm {H}}(\mathcal {C}, \mathbf {Z})$ is also equipped with a natural pairing $(-,-)$, defined as the negative of the Euler pairing. In the case where $\mathcal {C} = \operatorname {D_{{perf}}}(T)$ for a K3 or abelian surface $T$, this recovers the classical Mukai Hodge structure.

Our first main result gives a criterion for the validity of the integral Hodge conjecture for a CY2 category. This criterion is of a variational nature, and depends on the notion of a family of CY2 categories. In general, the notion of a family of categories can be formalized as an $S$-linear admissible subcategory $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$, where $X \to S$ is a morphism of varieties. There is a well-behaved notion of base change for such categories, which gives rise to a fiber category $\mathcal {C}_s \subset \operatorname {D_{{perf}}}(X_s)$ for any point $s \in S$. When $X \to S$ is smooth and proper, we show that a relative version of topological K-theory from [Reference MoulinosMou19] gives a local system $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S)$ on $S^{\mathrm {an}}$ underlying a canonical variation of Hodge structures of weight $0$, which fiberwise recovers the Hodge structure on $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}_s)$ from above.

We say $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ is a CY2 category over $S$ if $X \to S$ is smooth and proper and the fibers $\mathcal {C}_s$ are CY2 categories. For example, if $X \to S$ is a family of cubic fourfolds, then, similarly to the case where the base is a point, one can define a CY2 category $\mathcal {K}u(X) \subset \operatorname {D_{{perf}}}(X)$ over $S$ with fibers $\mathcal {K}u(X)_s \simeq \mathcal {K}u(X_s)$ (Example 6.7). As in the absolute case, we define the Mukai local system $\widetilde {\mathrm {H}}(\mathcal {C}/S, \mathbf {Z})$ of a CY2 category $\mathcal {C}$ over $S$ as a Tate twist of $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S)$. We can now state our first main theorem.

Theorem 1.1 Let $\mathcal {C}$ be a CY2 category over $\mathbf {C}$. Let $v \in \operatorname {Hdg}(\mathcal {C}, \mathbf {Z})$. Assume there exists a CY2 category $\mathcal {D}$ over a complex variety $S$ with points $0, 1 \in S(\mathbf {C})$ such that:

  1. (1) $\mathcal {D}_0 \simeq \mathcal {C}$;

  2. (2) $\mathcal {D}_1 \simeq \operatorname {D_{{perf}}}(T, \alpha )$ where $T$ is a K3 or abelian surface and $\alpha \in \operatorname {Br}(T)$ is a Brauer class;

  3. (3) $v$ remains of Hodge type along $S$, that is, extends to a section of the local system $\widetilde {\mathrm {H}}(\mathcal {D}/S, \mathbf {Z})$.

Further, assume $(v,v) \geq -2$ or $(v,v) \geq 0$ according to whether $T$ is a K3 or abelian surface. Then $v$ is algebraic, that is, lies in the image of $\mathrm {K}_0(\mathcal {C}) \to \widetilde {\mathrm {H}}(\mathcal {C}, \mathbf {Z})$.

In particular, if the cokernel of the map $\mathrm {K}_0(\mathcal {C}) \to \operatorname {Hdg}(\mathcal {C}, \mathbf {Z})$ is generated by elements $v$ as above, then this map is in fact surjective, that is, the integral Hodge conjecture holds for $\mathcal {C}$.

In practice, this reduces the integral Hodge conjecture for a given CY2 category to checking that it deforms within any Hodge locus to a category of the form $\operatorname {D_{{perf}}}(T, \alpha )$ (see Remark 8.3). We apply the theorem to prove the integral Hodge conjecture for the Kuznetsov components of cubic and GM fourfolds, and use this to deduce the following consequence.

Corollary 1.2 The integral Hodge conjecture in degree $2$ holds for cubic fourfolds and GM fourfolds.

This result is new for GM fourfolds. For cubic fourfolds it was originally proved by Voisin [Reference VoisinVoi07, Theorem 18], and was recently reproved in [Reference Bayer, Lahoz, Macrì, Nuer, Perry and StellariBLM+21] using the construction of Bridgeland stability conditions on the Kuznetsov component and the theory of stability conditions in families. One of the main contributions of this paper is to show that the particular geometry of cubic fourfolds and the difficult ingredients about stability conditions can be excised from the proof of [Reference Bayer, Lahoz, Macrì, Nuer, Perry and StellariBLM+21], giving a general tool for attacking cases of the integral Hodge conjecture.

Corollary 1.2 is natural from the point of view of rationality problems. One of the biggest open conjectures in classical algebraic geometry is the irrationality of very general cubic fourfolds. The same conjecture for GM fourfolds is closely related and expected to be equally difficult. Corollary 1.2 shows there is no obstruction to rationality for these fourfolds coming from the integral Hodge conjecture. Our argument applies more generally to any fourfold whose derived category decomposes into a collection of exceptional objects and a CY2 category that deforms within any Hodge locus to one of the form $\operatorname {D_{{perf}}}(T, \alpha )$. This jibes with the fact that, despite many recent advances on the rationality problem [Reference VoisinVoi15, Reference Colliot-Thélène and PirutkaCP16, Reference TotaroTot16, Reference Hassett, Pirutka and TschinkelHPT18, Reference SchreiederSch19a, Reference SchreiederSch19b, Reference Nicaise and ShinderNS19, Reference Kontsevich and TschinkelKT19], irrationality results remain out of reach for such fourfolds.

Our methods also lead to bounds on the torsion order of Voisin groups. As illustrations, we show that $\mathrm {V}^{3}(X)$ is $2$-torsion for $X$ a GM sixfold (Corollary 8.4), and that $\mathrm {V}^{4}(X)$ is $6$-torsion for $X \subset \mathbf {P}^{3} \times \mathbf {P}^{3} \times \mathbf {P}^{3}$ a smooth $(1,1,1)$ divisor (Corollary 6.14).

1.2 The variational integral Hodge conjecture and moduli spaces of objects

We now explain the idea of the proof of Theorem 1.1, which involves some results of independent interest. The first is an instance of the variational integral Hodge conjecture for categories. Recall that an object $E$ of the derived category of a variety is called simple if $\operatorname {Hom}(E, E)$ is one-dimensional, and universally gluable if $\operatorname {Ext}^{< 0}(E, E) = 0$.

Theorem 1.3 Let $\mathcal {C}$ be a CY2 category over a complex variety $S$. Let $\varphi$ be a section of the local system $\widetilde {\mathrm {H}}(\mathcal {C}/S, \mathbf {Z})$. Assume that there exists a complex point $0 \in S(\mathbf {C})$ such that the fiber $\varphi _0 \in \widetilde {\mathrm {H}}(\mathcal {C}_0, \mathbf {Z})$ is the class of a simple universally gluable object of $\mathcal {C}_0$. Then $\varphi _s \in \widetilde {\mathrm {H}}(\mathcal {C}_s, \mathbf {Z})$ is algebraic for every $s \in S(\mathbf {C})$, that is, lies in the image of $\mathrm {K}_0(\mathcal {C}_s) \to \widetilde {\mathrm {H}}(\mathcal {C}_s,\mathbf {Z})$.

This implies Theorem 1.1 because twisted derived categories of K3 or abelian surfaces always contain many simple universally gluable objects.

Our proof of Theorem 1.3 relies on moduli spaces of objects in categories. For any $S$-linear admissible subcategory $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ where $X \to S$ is a smooth proper morphism of complex varieties, Lieblich's work [Reference LieblichLie06] gives an algebraic stack $\mathcal {M}(\mathcal {C}/S) \to S$ parameterizing universally gluable objects in $\mathcal {C}$. For any section $\varphi$ of the local system $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S)$, there is an open substack $\mathcal {M}(\mathcal {C}/S, \varphi )$ parameterizing objects of class $\varphi$. We prove that if there is a point $0 \in S(\mathbf {C})$ such that the fiber $\varphi _0$ can be represented by the class of an object in $\mathcal {C}_0$ at which the morphism $\mathcal {M}(\mathcal {C}/S, \varphi ) \to S$ is smooth, then $\varphi _s$ is algebraic for every $s \in S(\mathbf {C})$ (Proposition 8.1). This gives a general method for proving the variational Hodge conjecture for categories, which can be thought of as a noncommutative version of Bloch's method from [Reference BlochBlo72].

In his seminal paper [Reference MukaiMuk84], Mukai proved that the moduli space of simple sheaves on a K3 or abelian surface is smooth. More recently, Inaba generalized this to moduli spaces of objects in the derived category of such a surface [Reference InabaIna11]. The following further generalization replaces a fixed surface with a family of CY2 categories, and implies Theorem 1.3. We write $s\mathcal {M}(\mathcal {C}/S, \varphi ) \subset \mathcal {M}(\mathcal {C}/S, \varphi )$ for the open substack of simple objects, which is a $\mathbf {G}_m$-gerbe over an algebraic space $s\mathrm {M}(\mathcal {C}/S,\varphi )$ (Lemma 7.3).

Theorem 1.4 Let $\mathcal {C}$ be a CY2 category over a complex variety $S$. Let $\varphi$ be a section of the local system $\widetilde {\mathrm {H}}(\mathcal {C}/S, \mathbf {Z})$ whose fibers $\varphi _s \in \widetilde {\mathrm {H}}(\mathcal {C}_s, \mathbf {Z})$ are Hodge classes for all $s \in S(\mathbf {C})$. Then $s\mathcal {M}(\mathcal {C}/S, \varphi )$ and $s\mathrm {M}(\mathcal {C}/S,\varphi )$ are smooth over $S$.

In Theorem 1.4, it is in fact enough to assume a single fiber of $\varphi$ is a Hodge class, because then all fibers are (Lemma 5.22).

Remark 1.5 Theorem 1.4 plays a crucial role in recent constructions of hyperkähler varieties as moduli spaces of Bridgeland stable objects in CY2 categories [Reference Bayer, Lahoz, Macrì, Nuer, Perry and StellariBLM+21, Reference Perry, Pertusi and ZhaoPPZ19]. Namely, the theorem allows one to prove facts (e.g. nonemptiness) about such moduli spaces by deformation from a special CY2 category (e.g. the derived category of a K3 surface). The special case of Theorem 1.4 where $\mathcal {C}$ is the Kuznetsov component of a family of cubic fourfolds was first proved in [Reference Bayer, Lahoz, Macrì, Nuer, Perry and StellariBLM+21, Theorem 3.1], using properties of cubic fourfolds. Our result does not use anything about the ambient variety containing $\mathcal {C}$ in its derived category, and thus provides a general tool for studying moduli spaces of objects in families of CY2 categories, which has already been put to use in [Reference Perry, Pertusi and ZhaoPPZ19].

This paper's approach to the (variational) integral Hodge conjecture via moduli spaces of objects may be useful in other contexts. It would be interesting, for instance, to apply this method to varieties whose Kuznetsov components are not CY2 categories. In a different direction, we plan to develop in a sequel to this paper a version of our results in positive characteristic, with applications to the integral Tate conjecture.

1.3 Intermediate Jacobians

The Hodge conjecture concerns the even-degree cohomology of a variety, but there are also many interesting questions about the Hodge structures on odd-degree cohomology. The machinery developed in this paper gives a version of Hodge theory in odd degree for noncommutative varieties. Namely, for an admissible subcategory $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ of the derived category of a smooth proper complex variety $X$ and any integer $n$, we show that the $n$th homotopy group of Blanc's topological K-theory gives a finitely generated abelian group $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C})$ which is equipped with a canonical weight $-n$ Hodge structure, whose Hodge decomposition is given in terms of Hochschild homology. These Hodge structures are Tate twists of each other for varying even or odd $n$, so there are essentially only two of interest: $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$ discussed above, and $\mathrm {K}_{1}^{\mathrm {top}}(\mathcal {C})$.

When $\mathcal {C} = \operatorname {D_{{perf}}}(X)$, the rational Hodge structure $\mathrm {K}_{1}^{\mathrm {top}}(\mathcal {C}) \otimes \mathbf {Q}$ recovers the rational odd cohomology $\mathrm {H}^{\mathrm {odd}}(X, \mathbf {Q})$, with the weight $-1$ Hodge structure obtained by taking appropriate Tate twists in each degree. The integral relation is more subtle, but at least assuming that $X$ is odd-dimensional and its odd-degree cohomology is concentrated in degree $\dim (X)$, $\mathrm {K}_{-\dim (X)}^{\mathrm {top}}(\operatorname {D_{{perf}}}(X))$ recovers the polarized Hodge structure $\mathrm {H}^{\dim (X)}(X, \mathbf {Z})$ (Proposition 5.23).

This has many applications to the structure of intermediate Jacobians. Recall that if $X$ is a smooth proper complex variety, then for any odd integer $k$ the intermediate Jacobian $J^{k}(X)$ is a complex torus constructed from the Hodge structure $\mathrm {H}^{k}(X, \mathbf {Z})$, which is in fact a canonically principally polarized abelian variety if the Hodge decomposition only has two terms (i.e. $\mathrm {H}^{k}(X, \mathbf {C}) = \mathrm {H}^{p,q}(X) \oplus \mathrm {H}^{q,p}(X)$ for some $p,q$) and $k = \dim (X)$. Intermediate Jacobians have vast applications in algebraic geometry, ranging from irrationality results [Reference Clemens and GriffithsCG72, Reference BeauvilleBea77] and Torelli theorems [Reference DebarreDeb89, Reference VoisinVoi88, Reference DebarreDeb90] to infinite generation results for algebraic cycles [Reference ClemensCle83, Reference VoisinVoi00]. As a sample application of our techniques, we prove the following theorem.

Theorem 1.6 Let $X$ be a smooth proper complex variety of odd dimension $n$, such that $\mathrm {H}^{k}(X, \mathbf {Z}) = 0$ for all odd $k < n$. Assume there is a semiorthogonal decomposition

\[ \operatorname{D_{{perf}}}(X) = \left \langle \operatorname{D_{{perf}}}(Y_1), \dots, \operatorname{D_{{perf}}}(Y_m) \right \rangle \]

where each $Y_i$ is a smooth proper complex variety of dimension $n_i$, such that:

  • if $n_i$ is odd then $\mathrm {H}^{k}(Y_i, \mathbf {Z}) = 0$ for all odd $k < n_i$; and

  • if $n_i$ is even then $\mathrm {H}^{\mathrm {odd}}(Y_i, \mathbf {Q}) = 0$.

Then there is an isomorphism of complex tori

(1.1)\begin{equation} J^{n}(X) \cong \bigoplus_{n_i \, \mathrm{odd}} J^{n_i}(Y_i) . \end{equation}

If we further assume that there is a fixed integer $t \geq 0$ such that for all odd $n_i$ we have $\mathrm {H}^{n_i}(Y_i, \mathbf {C}) = \mathrm {H}^{p_i, q_i}(Y_i) \oplus \mathrm {H}^{q_i, p_i}(Y_i)$ where $p_i - q_i = 2t +1$, then $\mathrm {H}^{n}(X, \mathbf {C}) = \mathrm {H}^{p,q}(X) \oplus \mathrm {H}^{q,p}(X)$ where $p - q = 2t+1$ and (1.1) is an isomorphism of principally polarized abelian varieties.

As an example, when combined with Bondal and Orlov's description [Reference Bondal and OrlovBO95, Theorem 2.9] of the derived category of an odd-dimensional intersection of two quadrics $X$, Theorem 1.6 recovers Reid's result identifying the intermediate Jacobian of $X$ with the Jacobian of the associated hyperelliptic curve [Reference ReidRei72].

We highlight the following special case of our results.

Corollary 1.7 Let $X$ be a smooth proper complex threefold such that $\mathrm {H}^{1}(X, \mathbf {Z}) = 0$. Assume there is a semiorthogonal decomposition

(1.2)\begin{equation} \operatorname{D_{{perf}}}(X) = \left \langle \operatorname{D_{{perf}}}(C_1), \dots, \operatorname{D_{{perf}}}(C_r), E_1, \dots, E_s \right \rangle \end{equation}

where each $C_i$ is a smooth proper curve and $E_j \in \operatorname {D_{{perf}}}(X)$ is an exceptional object. Then there is an isomorphism

(1.3)\begin{equation} J^{3}(X) \cong J^{1}(C_1) \oplus \cdots \oplus J^{1}(C_n) \end{equation}

of principally polarized abelian varieties. If we further assume that $\mathrm {H}^{5}(X, \mathbf {Z}) = 0$, then we have $\mathrm {H}^{3}(X, \mathbf {Z})_{\mathrm {tors}} = 0$, that is, $\mathrm {H}^{3}(X, \mathbf {Z})$ is torsion-free.

The first part of Corollary 1.7 is an immediate consequence of Theorem 1.6, while we prove the second part in § 5.3 as a consequence of a result (Proposition 5.23) relating odd cohomology to odd topological K-theory.

Remark 1.8 Let $X$ be a rationally connected smooth proper complex threefold. Then $\mathrm {H}^{1}(X, \mathbf {Z}) = \mathrm {H}^{5}(X, \mathbf {Z}) = 0$. Hence Corollary 1.7 shows that the existence of a semiorthogonal decomposition of the form (1.2) implies that $X$ satisfies both the Clemens–Griffiths criterion for rationality (the splitting of the intermediate Jacobian as a sum of Jacobians of curves) [Reference Clemens and GriffithsCG72] and the Artin–Mumford criterion (the vanishing of $\mathrm {H}^{3}(X,\mathbf {Z})_{\mathrm {tors}}$) [Reference Artin and MumfordAM72]. Kuznetsov's rationality conjectures [Reference KuznetsovKuz16a, Reference KuznetsovKuz10] (see also [Reference Bernardara and BolognesiBB12]) predict that if $X$ is rational, then a semiorthogonal decomposition of the form (1.2) exists. Thus, our result shows that Kuznetsov's conjectural criterion implies the classical two.

Theorem 1.6 and Corollary 1.7 (as well as Proposition 5.23 below) greatly generalize many results in the literature relating intermediate Jacobians to derived categories [Reference Bernardara and BolognesiBB13, Reference Bernardara and BolognesiBB12, Reference Bernardara and TabuadaBT16, Reference Kuznetsov and ProkhorovKuPr21]. For instance, the main result of [Reference Bernardara and BolognesiBB13] is the splitting (1.3) in the very special case where $X$ is a standard conic bundle over a rational surface with a decomposition (1.2) that is suitably compatible with the conic bundle structure; similarly, [Reference Kuznetsov and ProkhorovKuPr21, Proposition 8.4] gives the splitting (1.3) in the case where $X$ is a rationally connected threefold and there is a single curve in the decomposition (1.2).

More generally, our results can be used to relate intermediate Jacobians of varieties whose derived categories have a semiorthogonal component in common. Bernardara and Tabuada [Reference Bernardara and TabuadaBT16] previously studied this problem using noncommutative motives, but in general their results only give isogenies between the algebraic parts of intermediate Jacobians, which can only be shown to be isomorphisms under hypotheses that are difficult to check in practice. Our results, on the other hand, only require cohomological hypotheses which are easy to check, give simple proofs of the applications considered in [Reference Bernardara and TabuadaBT16], and also apply to many cases inaccessible by the results there (see Example 5.26).

As a final application, we give a simple proof of a recent result of Debarre and Kuznetsov [Reference Debarre and KuznetsovDK20a], which identifies the intermediate Jacobians of odd-dimensional GM varieties that are ‘generalized partners or duals’ (Theorem 5.29). Answering a question of Kuznetsov (see [Reference Debarre and KuznetsovDK20a, Remark 1.2]), we show that this follows from the equivalence proved in [Reference Kuznetsov and PerryKuPe19, Theorem 1.6] between the Kuznetsov components of such varieties.

The results of this paper suggest developing other aspects of the Hodge theory of categories for applications to classical algebraic geometry. For instance, it would be interesting to study Abel–Jacobi maps taking values in the intermediate Jacobians of categories (as defined in Definition 5.24); we leave this to future investigation.

1.4 Organization of the paper

In § 2 we begin by reviewing the framework of categories linear over a base scheme. In §§ 3 and 4 we review some aspects of Hochschild homology and cohomology, which are needed later in the paper for studying the Hodge theory of categories and the deformation theory of objects in a category. In § 5 we develop the Hodge theory of categories; in particular, we formulate the (integral) Hodge conjecture for categories and relate it to the corresponding conjecture for varieties, as well as prove the results on intermediate Jacobians described above. In § 6 we define CY2 categories and their associated Mukai Hodge structures, and survey the known examples of CY2 categories. In § 7 we prove Theorem 1.4 on the smoothness of relative moduli spaces of objects in families of CY2 categories. Finally, in § 8 we prove our other main results (Theorem 1.1, Corollary 1.2, and Theorem 1.3) as well as several complementary results.

1.5 Conventions

All schemes are assumed to be quasi-compact and quasi-separated. A variety over a field $k$ is an integral scheme which is separated and of finite type over $k$. For a scheme $X$, $\operatorname {D_{{perf}}}(X)$ denotes the category of perfect complexes and $\operatorname {D_{qc}}(X)$ denotes the unbounded derived category of quasi-coherent sheaves. If $\alpha \in \operatorname {Br}(X)$ is a Brauer class, $\operatorname {D_{{perf}}}(X, \alpha )$ denotes the category of perfect complexes over an Azumaya algebra $\mathcal {A}$ representing $\alpha$, consisting of complexes of $\mathcal {A}$-modules which are locally quasi-isomorphic to a bounded complex of locally projective $\mathcal {A}$-modules of finite rank. When $X$ is a smooth variety, as will be the case whenever $\operatorname {D_{{perf}}}(X, \alpha )$ is considered in this paper, this category agrees with the bounded derived category of coherent $\alpha$-twisted sheaves [Reference KuznetsovKuz06b, Lemma 10.19]. All functors are derived by convention. In particular, for a morphism $f \colon X \to Y$ of schemes we write $f_*$ and $f^{*}$ for the derived pushforward and pullback functors, and for $E, F \in \operatorname {D_{{perf}}}(X)$ we write $E \otimes F$ for the derived tensor product. For technical convenience, all categories are regarded as $\infty$-categories as reviewed in § 2, but most arguments in the paper can be made at the triangulated level for admissible subcategories of derived categories of varieties.

2. Linear categories

In this paper we use the formalism of categories linear over a base scheme. We summarize the key points of this theory here following [Reference PerryPer19], which is based on Lurie's work [Reference LurieLur17]. Throughout this section we fix a (quasi-compact and quasi-separated) base scheme $S$.

2.1 Small linear categories

An $S$-linear category $\mathcal {C}$ is a small idempotent-complete stable $\infty$-category equipped with a module structure over $\operatorname {D_{{perf}}}(S)$. The collection of all $S$-linear categories is organized into an $\infty$-category $\mathrm {Cat}_S$, which admits a symmetric monoidal structure. For $\mathcal {C}, \mathcal {D} \in \mathrm {Cat}_S$ we denote by

\[ \mathcal{C} \otimes_{\operatorname{D_{{perf}}}(S)} \mathcal{D} \in \mathrm{Cat}_S \]

their tensor product. A morphism $\mathcal {C} \to \mathcal {D}$ in $\mathrm {Cat}_S$, also called an $S$-linear functor, is an exact functor that suitably commutes with the action of $\operatorname {D_{{perf}}}(S)$; these morphisms form the objects of an $S$-linear category $\mathrm {Fun}_S(\mathcal {C}, \mathcal {D})$, which is the internal mapping object in the category $\mathrm {Cat}_S$.

If $\mathcal {C} \in \mathrm {Cat}_S$ and $T \to S$ is a morphism of schemes, then the tensor product

\[ \mathcal{C}_{T} = \mathcal{C} \otimes_{\operatorname{D_{{perf}}}(S)} \operatorname{D_{{perf}}}(T) \in \mathrm{Cat}_{T} \]

is naturally a $T$-linear category, called the base change of $\mathcal {C}$ along $T \to S$. If $s \in S$ is a point with residue field $\kappa (s)$, then we write $\mathcal {C}_s$ for the $\kappa (s)$-linear category obtained by base change along $\operatorname {Spec}(\kappa (s)) \to S$, and call it the fiber of $\mathcal {C}$ over $s \in S$. In this way, an $S$-linear category $\mathcal {C}$ can be thought of as a family of categories parameterized by $S$.

Example 2.1 Let $f \colon X \to S$ be a morphism of schemes. Then $\mathcal {C} = \operatorname {D_{{perf}}}(X)$ has the structure of an $S$-linear category, with action functor $\mathcal {C} \times \operatorname {D_{{perf}}}(S) \to \operatorname {D_{{perf}}}(X)$ given by $(E, F) \mapsto E \otimes f^{*}F$. If $T \to S$ is a morphism of schemes, then by [Reference Ben-Zvi, Francis and NadlerBZFN10, Theorem 1.2] there is a $T$-linear equivalence

\[ \mathcal{C}_{T} \simeq \operatorname{D_{{perf}}}(X_{T}) \]

where $X_{T} = X \times _{S} T \to T$ denotes the derived fiber product, which agrees with the usual fiber product of schemes if $X \to S$ and $T \to S$ are $\mathrm {Tor}$-independent over $S$.

2.2 Semiorthogonal decompositions

The above example can be amplified using the following observation. If $\mathcal {C} \in \mathrm {Cat}_S$, a semiorthogonal decomposition

(2.1)\begin{equation} \mathcal{C} = \left \langle \mathcal{C}_1, \dots, \mathcal{C}_m \right \rangle \end{equation}

is called $S$-linear if the $\operatorname {D_{{perf}}}(S)$-action preserves each of the components $\mathcal {C}_i$. In this case, the $\mathcal {C}_i$ inherit the structure of $S$-linear categories. In particular, if $X$ is an $S$-scheme, then $S$-linear semiorthogonal components of $\operatorname {D_{{perf}}}(X)$ are $S$-linear categories. This will be our main source of examples in the paper.

By [Reference PerryPer19, Lemma 3.15], given an $S$-linear semiorthogonal decomposition (2.1) and a morphism $T \to S$, there is an induced $T$-linear semiorthogonal decomposition

\[ \mathcal{C}_T = \left \langle (\mathcal{C}_1)_T, \dots, (\mathcal{C}_m)_T \right \rangle. \]

If $\mathcal {C} = \operatorname {D_{{perf}}}(X)$ and $X$ and $T$ are $\mathrm {Tor}$-independent over $S$, the base changes $(\mathcal {C}_i)_T$ can be expressed without the use of higher categories and derived algebraic geometry, by working inside the ambient category $\operatorname {D_{{perf}}}(X_T)$, see [Reference KuznetsovKuz11].

The property that an $S$-linear subcategory $\mathcal {A} \subset \mathcal {C}$ forms part of a semiorthogonal decomposition can be characterized in terms of the embedding functor $\alpha \colon \mathcal {A} \to \mathcal {C}$. Namely, we say $\mathcal {A} \subset \mathcal {C}$ is left admissible if $\alpha$ admits a left adjoint, right admissible if $\alpha$ admits a right adjoint, and admissible if $\alpha$ admits both adjoints. Then if $\mathcal {A}, \mathcal {B} \subset \mathcal {C}$ are $S$-linear subcategories, we have a semiorthogonal decomposition $\mathcal {C} = \left \langle \mathcal {A}, \mathcal {B} \right \rangle$ if and only if $\mathcal {A}$ is left admissible and $\mathcal {B} = {{}^{\perp }}\mathcal {A}$, if and only if $\mathcal {B}$ is right admissible and $\mathcal {A} = \mathcal {B}^{\perp }$.

2.3 Presentable linear categories

For technical reasons it is sometimes useful to work with ‘large’ versions of linear categories, which we review here; for clarity we sometimes say ‘small $S$-linear category’ to mean an $S$-linear category in the sense of § 2.1. Large categories will only be needed for our discussion of Hochschild (co)homology in §§ 3 and 4.

A presentable $S$-linear category $\mathcal {C}$ is a presentable stable $\infty$-category $\mathcal {C}$ equipped with a module structure over $\operatorname {D_{qc}}(S)$. As in the case of small linear categories, the collection of all such categories is organized into a symmetric monoidal $\infty$-category $\mathrm {PrCat}_S$, whose tensor product is denoted by

\[ \mathcal{C} \otimes_{\operatorname{D_{qc}}(S)} \mathcal{D} \in \mathrm{PrCat}_S. \]

A morphism $\mathcal {C} \to \mathcal {D}$ in $\mathrm {PrCat}_S$ is a cocontinuous $S$-linear functor; these morphisms form the objects of a presentable $S$-linear category $\mathrm {Fun}_{S}(\mathcal {C}, \mathcal {D})$, which is the internal mapping object in the category $\mathrm {PrCat}_S$.

Many presentable $S$-linear categories which arise in practice are compactly generated, for example, $\operatorname {D_{qc}}(S)$ is so by our assumption that $S$ is quasi-compact and quasi-separated [Reference Bondal and van den BerghBvdB03, Theorem 3.1.1]. We denote by $\mathrm {PrCat}_{S}^{\omega }$ the $\infty$-category of compactly generated presentable $S$-linear categories, with morphisms the cocontinuous $S$-linear functors which preserve compact objects. Again, $\mathrm {PrCat}_{S}^{\omega }$ admits a symmetric monoidal structure and an internal mapping object $\mathrm {Fun}_{S}^{\omega }(\mathcal {C}, \mathcal {D})$ for $\mathcal {C}, \mathcal {D} \in \mathrm {PrCat}_S^{\omega }$.

The various versions of linear categories $\mathrm {Cat}_S$, $\mathrm {PrCat}_S$, and $\mathrm {PrCat}_S^{\omega }$ are related as follows. By definition, $\mathrm {PrCat}_S^{\omega }$ is a nonfull subcategory of $\mathrm {PrCat}_S$. Moreover, for any $\mathcal {C} \in \mathrm {Cat}_S$ there is a category $\operatorname {Ind}(\mathcal {C}) \in \mathrm {PrCat}_S^{\omega }$ called its Ind-completion, which roughly is obtained from $\mathcal {C}$ by freely adjoining all filtered colimits. This gives a functor

\[ \operatorname{Ind} \colon \mathrm{Cat}_S \to \mathrm{PrCat}_{S}^{\omega} \]

which is in fact a symmetric monoidal equivalence with inverse the functor

\[ (-){}^{\rm c} \colon \mathrm{PrCat}_S^{\omega} \to \mathrm{Cat}_S \]

taking $\mathcal {C} \in \mathrm {PrCat}_S$ to its subcategory $\mathcal {C}^{\rm c}$ of compact objects.

Example 2.2 Let $f \colon X \to S$ be a morphism of schemes. Similar to Example 2.1, $\operatorname {D_{qc}}(X)$ naturally has the structure of a presentable $S$-linear category. In fact, if $X$ is quasi-compact and quasi-separated, then there is an equivalence $\operatorname {Ind}(\operatorname {D_{{perf}}}(X)) \simeq \operatorname {D_{qc}}(X)$ of presentable $S$-linear categories.

2.4 Mapping objects

For objects $E,F \in \mathcal {C}$ of an $\infty$-category, we write $\operatorname {Map}_{\mathcal {C}}(E,F)$ for the space of maps from $E$ to $F$. If $\mathcal {C}$ is a presentable $S$-linear category, then there is a mapping object

\begin{align*} \mathcal{H}\!{\it om}_S(E,F) \in \operatorname{D_{qc}}(S) \end{align*}

characterized by equivalences

\[ \operatorname{Map}_{\operatorname{D_{qc}}(S)}(G, \mathcal{H}\!{\it om}_S(E,F)) \simeq \operatorname{Map}_{\mathcal{C}}( E \otimes G, F ) \]

for $G \in \operatorname {D_{qc}}(S)$.

If instead $\mathcal {C}$ is an $S$-linear category, we write $\mathcal {H}\!{\it om}_S(E, F) \in \operatorname {D_{qc}}(S)$ for the mapping object between $E$ and $F$ regarded as objects of the presentable $S$-linear category $\operatorname {Ind}(\mathcal {C})$; equivalently, $\mathcal {H}\!{\it om}_S(E, F)$ can be characterized by equivalences

\[ \operatorname{Map}_{\operatorname{D_{qc}}(S)}(G, \mathcal{H}\!{\it om}_S(E,F)) \simeq \operatorname{Map}_{\mathcal{C}}( E \otimes G, F) \]

for $G \in \operatorname {D_{{perf}}}(S)$. For $i \in \mathbf {Z}$ we write $\operatorname {\mathcal {E}\!{\it xt}}^{i}_S(E,F)$ for the degree $i$ cohomology sheaf of $\mathcal {H}\!{\it om}_S(E,F)$, and $\operatorname {Ext}^{i}_S(E,F)$ for the degree $i$ hypercohomology of $\mathcal {H}\!{\it om}_S(E,F)$.

Example 2.3 Let $f \colon X \to S$ be a morphism of schemes. Then, for $E,F \in \operatorname {D_{qc}}(X)$, we have

\[ \mathcal{H}\!{\it om}_S(E,F) \simeq f_* \mathcal{H}\!{\it om}_X(E,F) \]

where $\mathcal {H}\!{\it om}_X(E,F) \in \operatorname {D_{qc}}(X)$ denotes the derived sheaf Hom on $X$.

2.5 Dualizable categories

Let $(\mathcal {A}, \otimes, \mathbf {1})$ be a symmetric monoidal $\infty$-category. An object $A \in \mathcal {A}$ is called dualizable if there exist an object $A^{\scriptscriptstyle \vee } \in \mathcal {A}$ and morphisms

\[ \mathrm{coev}_A \colon \mathbf{1} \to A \otimes A^{\scriptscriptstyle\vee} \quad \text{and} \quad \mathrm{ev}_A \colon A^{\scriptscriptstyle\vee} \otimes A \to \mathbf{1} \]

such that the compositions

\begin{gather*} A \xrightarrow{ \, \mathrm{coev}_A \otimes \mathrm{id}_{A} \,} A \otimes A^{\scriptscriptstyle\vee} \otimes A \xrightarrow{\, \mathrm{id}_{A} \otimes \mathrm{ev}_A \,} A , \\ A^{\scriptscriptstyle\vee} \xrightarrow{ \, \mathrm{id}_{A^{\scriptscriptstyle\vee}} \otimes \mathrm{coev}_A \,} A^{\scriptscriptstyle\vee} \otimes A \otimes A^{\scriptscriptstyle\vee} \xrightarrow{\, \mathrm{ev}_A \otimes \mathrm{id}_{A^{\scriptscriptstyle\vee}} \,} A^{\scriptscriptstyle\vee} \end{gather*}

are equivalent to the identity morphisms of $A$ and $A^{\scriptscriptstyle \vee }$.

Remark 2.4 Dualizability of an object $A \in \mathcal {A}$ is detected at the level of the homotopy category $\mathrm {h} \mathcal {A}$; moreover, if $A$ is dualizable, then the object $A^{\scriptscriptstyle \vee }$ and the evaluation and coevaluation morphisms are uniquely determined in $\mathrm {h}\mathcal {A}$.

The following gives a large source of dualizable presentable linear categories.

Lemma 2.5 [Reference PerryPer19, Lemma 4.3]

Let $\mathcal {C}$ be a compactly generated presentable $S$-linear category. Then $\mathcal {C}$ is dualizable as an object of $\mathrm {PrCat}_S$, with dual given by

\[ \mathcal{C}^{\scriptscriptstyle\vee} = \operatorname{Ind}((\mathcal{C}{}^{\rm c})^{\mathrm{op}}) \]

where $(\mathcal {C}^{\rm c})^{\mathrm {op}}$ denotes the opposite of the category $\mathcal {C}^{\rm c}$ of compact objects in $\mathcal {C}$. There is a canonical equivalence $\mathcal {C} \otimes _{\operatorname {D_{qc}}(S)} \mathcal {C}^{\scriptscriptstyle \vee } \simeq \mathrm {Fun}_S(\mathcal {C}, \mathcal {C})$ under which the coevaluation morphism

\[ \mathrm{coev}_{\mathcal{C}} \colon \operatorname{D_{qc}}(S) \to \mathcal{C} \otimes_{\operatorname{D_{qc}}(S)} \mathcal{C}^{\scriptscriptstyle\vee} \]

is the canonical functor sending $\mathcal {O}_S \in \operatorname {D_{qc}}(S)$ to $\mathrm {id}_{\mathcal {C}} \in \mathrm {Fun}_S(\mathcal {C}, \mathcal {C})$. The evaluation morphism

\[ \mathrm{ev}_{\mathcal{C}} \colon \mathcal{C}^{\scriptscriptstyle\vee} \otimes_{\operatorname{D_{qc}}(S)} \mathcal{C} \to \operatorname{D_{qc}}(S) \]

is induced by the functor $\mathcal {H}\!{\it om}_{S}(-,-) \colon (\mathcal {C}^{\rm c})^{\mathrm {op}} \times \mathcal {C}^{\rm c} \to \operatorname {D_{qc}}(S)$.

In particular, the lemma implies the following corollary, recalling that by convention all schemes are quasi-compact and quasi-separated.

Corollary 2.6 If $f \colon X \to S$ is a morphism of schemes, then $\operatorname {D_{qc}}(X)$ is a dualizable presentable $S$-linear category.

Dualizability of a small $S$-linear category is more restrictive. Recall that if $\mathcal {C}$ is a small $S$-linear category, then $\mathcal {C}$ is called:

  • proper (over $S$) if $\mathcal {H}\!{\it om}_S(E,F) \in \operatorname {D_{{perf}}}(S) \subset \operatorname {D_{qc}}(S)$ for all $E,F \in \mathcal {C}$; and

  • smooth (over $S$) if $\mathrm {id}_{\operatorname {Ind}(\mathcal {C})} \in \mathrm {Fun}_{\operatorname {D_{qc}}(S)}(\operatorname {Ind}(\mathcal {C}), \operatorname {Ind}(\mathcal {C}))$ is a compact object.

Moreover, $\mathcal {C}$ is dualizable as an object of $\mathrm {Cat}_S$ if and only if $\mathcal {C}$ is smooth and proper over $S$, in which case the dual is given by $\mathcal {C}^{\scriptscriptstyle \vee } = \mathcal {C}^{\mathrm {op}}$ [Reference PerryPer19, Lemma 4.8].

This is closely related to the usual notions of smoothness and properness in geometry. For instance, if $f \colon X \to S$ is a smooth and proper morphism, then $\operatorname {D_{{perf}}}(X)$ is smooth and proper over $S$ [Reference PerryPer19, Lemma 4.9]. Further, semiorthogonal components of a smooth proper $S$-linear category are automatically smooth, proper, and admissible [Reference PerryPer19, Lemma 4.15]. Putting these observations together gives the following key examples of smooth and proper linear categories for this paper.

Lemma 2.7 Let $f \colon X \to S$ be a smooth proper morphism. If $\mathcal {C}$ is an $S$-linear semiorthogonal component of $\operatorname {D_{{perf}}}(X)$, then $\mathcal {C}$ is smooth and proper over $S$, and the embedding $\mathcal {C} \hookrightarrow \operatorname {D_{{perf}}}(X)$ is admissible.

Smooth and proper categories enjoy many nice properties. For instance, a smooth proper $S$-linear category $\mathcal {C}$ always admits a Serre functor $\mathrm {S}_{\mathcal {C}/S}$ over $S$ [Reference PerryPer19, Lemma 4.19]. By definition, this means $\mathrm {S}_{\mathcal {C}/S}$ is an autoequivalence of $\mathcal {C}$ such that there are natural equivalences

\[ \mathcal{H}\!{\it om}_S(E, \mathrm{S}_{\mathcal{C}/S}(F)) \simeq \mathcal{H}\!{\it om}_S(F,E)^{\scriptscriptstyle\vee} \]

for $E, F \in \mathcal {C}$. For example, if $f \colon X \to S$ is a smooth proper morphism of relative dimension $n$, then $\mathrm {S}_{\operatorname {D_{{perf}}}(X)/S} = - \otimes \omega _{X/S}[n]$ is a Serre functor over $S$.

3. Hochschild homology

In this section we review the definition of Hochschild homology and various of its properties relevant to this paper. All of the constructions and results we discuss are well known in some form, but for convenience or lack of suitable references we often sketch the details.

There are various settings in which Hochschild homology can be defined. In this paper we consider Hochschild homology as an invariant of small linear categories or dualizable presentable linear categories, defined in terms of categorical traces. See [Reference KuznetsovKuz09] for a more down-to-earth definition in the case of a semiorthogonal component of the derived category of a smooth proper variety, which is the case needed in the main results of this paper. The definition below has the advantage of being manifestly canonical and convenient for making abstract arguments.

In general, if $(\mathcal {A}, \otimes, \mathbf {1})$ is a symmetric monoidal $\infty$-category and $A \in \mathcal {A}$ is a dualizable object, then the trace of an endomorphism $F \colon A \to A$ is the map $\operatorname {Tr}(F) \in \operatorname {Map}_{\mathcal {A}}(\mathbf {1}, \mathbf {1})$ given as the composite

\begin{align*} \mathbf{1} \xrightarrow{\, \mathrm{coev}_A \,} A \otimes A^{\scriptscriptstyle\vee} \xrightarrow{\, F \otimes \mathrm{id}_{A^{\scriptscriptstyle\vee}} \,} A \otimes A^{\scriptscriptstyle\vee} \simeq A^{\scriptscriptstyle\vee} \otimes A \xrightarrow{\, \mathrm{ev}_{A} \,} \mathbf{1}. \end{align*}

We will be interested in the case where $\mathcal {A}$ is $\mathrm {Cat}_S$ or $\mathrm {PrCat}_S$. In this case, $\mathbf {1}$ is $\operatorname {D_{{perf}}}(S)$ or $\operatorname {D_{qc}}(S)$, and the functor $\operatorname {Tr}(F)$ is determined by its value on the structure sheaf $\mathcal {O}_S$.

Definition 3.1 Let $\mathcal {C}$ be a dualizable presentable $S$-linear category, and let $F \colon \mathcal {C} \to \mathcal {C}$ be an endomorphism. Then the Hochschild homology of $\mathcal {C}$ over $S$ with coefficients in $F$ is the complex

\[ \operatorname{HH}_*(\mathcal{C}/S, F) = \operatorname{Tr}(F)(\mathcal{O}_S) \in \operatorname{D_{qc}}(S). \]

The Hochschild homology of $\mathcal {C}$ over $S$ is the complex

\[ \operatorname{HH}_*(\mathcal{C}/S) = \operatorname{HH}_*(\mathcal{C}/S, \mathrm{id}_{\mathcal{C}}) \in \operatorname{D_{qc}}(S). \]

If $\mathcal {C}$ is an $S$-linear category and $F \colon \mathcal {C} \to \mathcal {C}$ is an endomorphism, then $\operatorname {Ind}(\mathcal {C})$ is a dualizable presentable $S$-linear category by Lemma 2.5, and we define

\begin{align*} \operatorname{HH}_*(\mathcal{C}/S, F) & = \operatorname{HH}_*(\operatorname{Ind}(\mathcal{C})/S, \operatorname{Ind}(F)) , \\ \operatorname{HH}_*(\mathcal{C}/S) & = \operatorname{HH}_*(\mathcal{C}/S, \mathrm{id}_{\mathcal{C}}) . \end{align*}

Note that any object $F \in \operatorname {D_{qc}}(S)$ gives a natural coefficient for Hochschild homology of categories over $S$, by considering the corresponding endofunctor $- \otimes F \colon \mathcal {C} \to \mathcal {C}$; in this situation, we use the notation

\begin{align*} \operatorname{HH}_*(\mathcal{C}/S, F) = \operatorname{HH}_*(\mathcal{C}/S, (- \otimes F)). \end{align*}

Finally, in any of the above situations, for $i \in \mathbf {Z}$ we set

\[ \operatorname{HH}_i(\mathcal{C}/S, F) = \mathrm{H}^{-i}(\operatorname{HH}_*(\mathcal{C}/S, F)) \]

to be the degree $-i$ cohomology sheaf of $\operatorname {HH}_*(\mathcal {C}/S,F)$.

Remark 3.2 If $\mathcal {C}$ is a dualizable small $S$-linear category (equivalently, a smooth and proper small $S$-linear category; see § 2.5) and $F \colon \mathcal {C} \to \mathcal {C}$ is an endomorphism, then by definition the trace of $F$ is a functor $\operatorname {Tr}(F) \colon \operatorname {D_{{perf}}}(S) \to \operatorname {D_{{perf}}}(S)$. Further, there is a canonical equivalence $\operatorname {Ind}(\operatorname {Tr}(F)) \simeq \operatorname {Tr}(\operatorname {Ind}(F))$, because by Remark 2.4 the functor $\operatorname {Ind}$ takes the duality data of $\mathcal {C}$ to that of $\operatorname {Ind}(\mathcal {C})$. Thus $\operatorname {HH}_*(\mathcal {C}/S, F) \simeq \operatorname {Tr}(F)(\mathcal {O}_S) \in \operatorname {D_{{perf}}}(S)$.

Below we review some well-known properties of Hochschild homology, in a guise that is tailored to our purposes.

3.1 Functoriality

Hochschild homology (with coefficients) is suitably functorial. This functoriality exists in the general context of traces of dualizable objects in a symmetric monoidal $(\infty,2)$-category (see, for example, [Reference Ben-Zvi and NadlerBZN19, Reference Toën and VezzosiTV15, Reference Hoyois, Scherotzke and SibillaHSS17, Reference Kondyrev and PrikhodkoKoPr20]), but here we only recall the relevant details in the case of Hochschild homology of categories.

Let $(\mathcal {C}, F)$ be a pair where $\mathcal {C}$ is a dualizable presentable $S$-linear category and $F \colon \mathcal {C} \to \mathcal {C}$ is an endomorphism. Let $(\mathcal {D}, G)$ be another such pair. We define a morphism $(\mathcal {C}, F) \to (\mathcal {D}, G)$ to be a pair $(\Phi, \gamma )$ where $\Phi \colon \mathcal {C} \to \mathcal {D}$ is morphism that admits a cocontinuous right adjoint $\Phi ^{!}$ (which is thus also a morphism in $\mathrm {PrCat}_S$), and $\gamma \colon \Phi \circ F \to G \circ \Phi$ is a natural transformation of functors; in other words, a morphism is a (not necessarily commutative) diagram

Given such a morphism $(\Phi, \gamma )$, we consider the diagram

(3.1)

where:

  • $(\Phi ^{!})^{\scriptscriptstyle \vee } \colon \mathcal {C}^{\scriptscriptstyle \vee } \to \mathcal {D}^{\scriptscriptstyle \vee }$ is the dual of the functor $\Phi ^{!} \colon \mathcal {D} \to \mathcal {C}$, defined as the composition

    \[ \mathcal{C}^{\scriptscriptstyle\vee} \xrightarrow{ \mathrm{id}_{\mathcal{C}^{\scriptscriptstyle\vee}} \otimes \mathrm{coev}_{\mathcal{D}}} \mathcal{C}^{\scriptscriptstyle\vee} \otimes_{\operatorname{D_{qc}}(S)} \mathcal{D} \otimes_{\operatorname{D_{qc}}(S)} \mathcal{D}^{\scriptscriptstyle\vee} \xrightarrow{ \mathrm{id}_{\mathcal{C}^{\scriptscriptstyle\vee}} \otimes \Phi^{!} \otimes \mathrm{id}_{\mathcal{D}^{\scriptscriptstyle\vee}}} \mathcal{C}^{\scriptscriptstyle\vee} \otimes_{\operatorname{D_{qc}}(S)} \mathcal{C} \otimes_{\operatorname{D_{qc}}(S)} \mathcal{D}^{\scriptscriptstyle\vee} \xrightarrow{\mathrm{ev}_{\mathcal{C}} \!\otimes \mathrm{id}_{\mathcal{D}^{\scriptscriptstyle\vee}}} \mathcal{D}^{\scriptscriptstyle\vee} ; \]
  • the $2$-morphism in the first square is the natural transformation

    \[ (\Phi \otimes (\Phi^{!})^{\scriptscriptstyle\vee}) \circ \mathrm{coev}_{\mathcal{C}} \simeq ((\Phi \circ \Phi^{!}) \otimes \mathrm{id}_{\mathcal{D}^{\scriptscriptstyle\vee}}) \circ \mathrm{coev}_{\mathcal{D}} \to \mathrm{coev}_{\mathcal{D}} \]
    induced by the counit of the adjunction between $\Phi$ and $\Phi ^{!}$;
  • the $2$-morphism in the last square is the natural transformation

    \[ \mathrm{ev}_{\mathcal{C}} \to \mathrm{ev}_{\mathcal{C}} \circ ((\Phi^{!} \circ \Phi) \otimes \mathrm{id}_{\mathcal{C}^{\scriptscriptstyle\vee}}) \simeq \mathrm{ev}_{\mathcal{D}} \circ (\Phi \otimes (\Phi^{!})^{\scriptscriptstyle\vee}) \]
    induced by the unit of the adjunction between $\Phi$ and $\Phi ^{!}$.

The compositions along the top and bottom of (3.1) are by definition the traces $\operatorname {Tr}(F)$ and $\operatorname {Tr}(G)$, so the composition of the $2$-morphisms in the diagram gives a natural transformation

\[ \operatorname{Tr}(\Phi, \gamma) \colon \operatorname{Tr}(F) \to \operatorname{Tr}(G). \]

In particular, applying this to $\mathcal {O}_S$, we obtain a morphism on Hochschild homology

\[ \operatorname{HH}_*(\Phi, \gamma) \colon \operatorname{HH}_*(\mathcal{C}/S, F) \to \operatorname{HH}_*(\mathcal{D}/S, G). \]

The functoriality of Hochschild homology implies the following result; cf. [Reference KuznetsovKuz09] which treats the case of semiorthogonal decompositions of varieties.

Lemma 3.3 Let $\mathcal {C} = \left \langle \mathcal {C}_1, \dots, \mathcal {C}_m \right \rangle$ be an $S$-linear semiorthogonal decomposition with admissible components. Then there is an equivalence

\[ \operatorname{HH}_*(\mathcal{C}/S) \simeq \operatorname{HH}_*(\mathcal{C}_1/S) \oplus \cdots \oplus \operatorname{HH}_*(\mathcal{C}_m/S), \]

where the map $\operatorname {HH}_*(\mathcal {C}/S) \to \operatorname {HH}_*(\mathcal {C}_i/S)$ is induced by the projection functor onto the component $\mathcal {C}_i$.

3.2 Chern characters

The functoriality of Hochschild homology can be used to define a theory of Chern characters as follows.

Let $\mathcal {C}$ be a presentable $S$-linear category. Then any object $E \in \mathcal {C}$ determines an $S$-linear functor $\Phi _{E} \colon \operatorname {D_{qc}}(S) \to \mathcal {C}$ determined by $\Phi _{E}(\mathcal {O}_S) = E$, whose right adjoint

\[ \Phi_{E}^{!} = \mathcal{H}\!{\it om}_S(E, -) \colon \mathcal{C} \to \operatorname{D_{qc}}(S) \]

is cocontinuous if and only if $E$ is a compact object of $\mathcal {C}$.

Now we assume that $E$ is compact, $\mathcal {C}$ is dualizable, and $F \colon \mathcal {C} \to \mathcal {C}$ is an endomorphism; for instance, $\mathcal {C}$ could be of the form $\mathcal {C} = \operatorname {Ind}(\mathcal {C}_0)$ for a small $S$-linear category $\mathcal {C}_0$ and $E \in \mathcal {C}_0$. In this setup, we will construct a morphism

\[ \operatorname{ch}_{E,F} \colon \mathcal{H}\!{\it om}_S(E, F(E)) \to \operatorname{HH}_*(\mathcal{C}/S, F) \]

in $\operatorname {D_{qc}}(S)$, called the Chern character of $E$ with coefficients in $F$; in practice, we often drop the subscripts $E$ and $F$ in $\operatorname {ch}_{E,F}$ when they are clear from context. By Yoneda's lemma, it suffices to construct functorially in $G \in \operatorname {D_{qc}}(S)$ a map

(3.2)\begin{equation} \operatorname{Map}_{\operatorname{D_{qc}}(S)}(G, \mathcal{H}\!{\it om}_S(E, F(E))) \to \operatorname{Map}_{\operatorname{D_{qc}}(S)}(G, \operatorname{HH}_*(\mathcal{C}/S, F)). \end{equation}

The left-hand side is identified with $\operatorname {Map}_{\mathcal {C}}(E \otimes G, F(E))$. This mapping space is in turn identified with the space of natural transformations $\gamma \colon \Phi _{E} \circ (- \otimes G) \to F \circ \Phi _E$. The pair $(\Phi _E, \gamma )$ is then a morphism of pairs $(\operatorname {D_{qc}}(S), - \otimes G) \to (\mathcal {C}, F)$ as considered in § 3.1, and hence determines a morphism on Hochschild homology

\[ G \simeq \operatorname{HH}_*(\operatorname{D_{qc}}(S)/S, G) \to \operatorname{HH}_*(\mathcal{C}/S, F). \]

All together, this gives the required map (3.2).

3.3 Base change

Hochschild homology satisfies base change in the following sense.

Lemma 3.4 Let $\mathcal {C}$ be a dualizable presentable $S$-linear category and let $F \colon \mathcal {C} \to \mathcal {C}$ be an endomorphism. Let $g \colon T \to S$ be a morphism of schemes. Let $F_T \colon \mathcal {C}_T \to \mathcal {C}_T$ be the base change of $F$ along $g$. Then there is a canonical equivalence

\[ g^{*}\operatorname{HH}_*(\mathcal{C}/S, F) \simeq \operatorname{HH}_*(\mathcal{C}_T/T, F_T) . \]

Proof. It follows from the definitions that the trace $\operatorname {Tr}(F) \colon \operatorname {D_{qc}}(S) \to \operatorname {D_{qc}}(S)$ commutes with base change, which implies the result.

For smooth proper categories in characteristic $0$, the individual Hochschild homology groups are vector bundles and satisfy base change.

Theorem 3.5 [Reference KaledinKal08, Reference KaledinKal17, Reference MathewMat20]

Let $\mathcal {C}$ be a smooth proper $S$-linear category, where $S$ is a $\mathbf {Q}$-scheme. Then $\operatorname {HH}_i(\mathcal {C}/S)$ is a finite locally free sheaf on $S$ for any $i \in \mathbf {Z}$. Further, if $g \colon T \to S$ is a morphism of schemes, then for any $i \in \mathbf {Z}$ there is a canonical isomorphism

\[ g^{*}\operatorname{HH}_i(\mathcal{C}/S) {\cong} \operatorname{HH}_i(\mathcal{C}_T/T). \]

Proof. The first part follows from the degeneration of the noncommutative Hodge-to-de Rham spectral sequence proved by Kaledin [Reference KaledinKal08, Reference KaledinKal17]; see also Mathew's recent proof [Reference MathewMat20, Theorem 1.3]. The second claim then follows from Lemma 3.4.

3.4 Mukai pairing

In the smooth and proper case, Hochschild homology carries a canonical nondegenerate pairing, known as the Mukai pairing. This pairing has been studied from many points of view in the literature [Reference Căldăraru and WillertonCW10, Reference CăldăraruCăl05, Reference ShklyarovShk13, Reference MarkarianMar09].

Lemma 3.6 Let $\mathcal {C}$ be a smooth proper $S$-linear category. Then $\operatorname {HH}_*(\mathcal {C}/S) \in \operatorname {D_{{perf}}}(S)$ and there is a canonical nondegenerate pairing $\operatorname {HH}_*(\mathcal {C}/S) \otimes \operatorname {HH}_*(\mathcal {C}/S) \to \mathcal {O}_S$.

Proof. We sketch a short proof following [Reference Antieau and VezzosiAV20]. (We already observed $\operatorname {HH}_*(\mathcal {C}/S) \in \operatorname {D_{{perf}}}(S)$ in Remark 3.2, but give another proof here.) The functor $\operatorname {HH}_*(-/S) \colon \mathrm {Cat}_S \to \operatorname {D_{qc}}(S)$ is symmetric monoidal; see, for instance, [Reference Antieau and VezzosiAV20, Proposition 2.1] (where the result is stated for $S$ affine, but from which the general case follows by Lemma 3.4). If $\mathcal {C}$ is smooth and proper over $S$, then it is dualizable as an object of $\mathrm {Cat}_S$. Since $\operatorname {HH}_*(-/S)$ is symmetric monoidal, its value on $\mathcal {C}$ is also dualizable as an object of $\operatorname {D_{qc}}(S)$, and hence belongs to $\operatorname {D_{{perf}}}(S)$. The evaluation morphism for $\operatorname {HH}_*(\mathcal {C}/S)$ is obtained by applying the functor $\operatorname {HH}_*(-/S)$ to the evaluation morphism for $\mathcal {C}$, and hence takes the form

\[ \operatorname{HH}_*(\mathcal{C}^{\scriptscriptstyle\vee}/S) \otimes \operatorname{HH}_*(\mathcal{C}/S) \to \mathcal{O}_S . \]

But it follows from the definition of Hochschild homology that there is a canonical identification $\operatorname {HH}_*(\mathcal {C}^{\scriptscriptstyle \vee }/S) \simeq \operatorname {HH}_*(\mathcal {C}/S)$. This completes the proof.

We will need a compatibility between the Mukai pairing, Serre duality, and Chern characters, which we formulate in the case where the base is a field.

Lemma 3.7 Let $\mathcal {C}$ be a smooth proper $k$-linear category, where $k$ is a field. Then for $i \in \mathbf {Z}$ there is an isomorphism

\[ \operatorname{HH}_i(\mathcal{C}/k) \cong \operatorname{Ext}^{-i}_{k}(\mathrm{id}_{\mathcal{C}}, \mathrm{S}_{\mathcal{C}}) \]

where $\mathrm {S}_{\mathcal {C}}$ is the Serre functor for $\mathcal {C}$ over $k$ and the $\operatorname {Ext}$ group is considered in the category of $k$-linear endofunctors of $\mathcal {C}$. Moreover, for $E \in \mathcal {C}$ if we denote by

\[ \eta_E \colon \operatorname{HH}_i(\mathcal{C}/k) \to \operatorname{Ext}^{-i}_k(E, \mathrm{S}_{\mathcal{C}}(E)) \]

the natural map arising from the above isomorphism, then there is a commutative diagram

where the left vertical arrow is given by Serre duality and the right vertical arrow is give by the Mukai pairing.

Proof. This is well known to the experts. We provide references to the literature where the statements are proved in a slightly different setup (e.g. $\mathcal {C}$ assumed to be a semiorthogonal component in the derived category of a variety): the isomorphism $\operatorname {HH}_i(\mathcal {C}/k) \cong \operatorname {Ext}^{-i}_{k}(\mathrm {id}_{\mathcal {C}}, \mathrm {S}_{\mathcal {C}})$ follows from [Reference KuznetsovKuz09, Theorem 4.5 and Proposition 4.6], and the commutativity of the diagram follows from [Reference Căldăraru and WillertonCW10, Proposition 11].

3.5 HKR isomorphism

The Hochschild–Kostant–Rosenberg (HKR) isomorphism identifies the Hochschild homology of the derived category of a scheme in terms of Hodge cohomology. This subject has been studied by many authors (see, for example, [Reference Hochschild, Kostant and RosenbergHKR62, Reference SwanSwa96, Reference YekutieliYek02]); the form in which we state the result is a consequence of Yekutieli's work [Reference YekutieliYek02]. For a morphism $X \to S$ and an endomorphism $F \colon \operatorname {D_{{perf}}}(X) \to \operatorname {D_{{perf}}}(X)$, we use the notation $\operatorname {HH}_*(X/S, F) = \operatorname {HH}_*(\operatorname {D_{{perf}}}(X)/S, F)$.

Theorem 3.8 [Reference YekutieliYek02]

Let $f \colon X \to S$ be smooth morphism of relative dimension $n$, where $n!$ is invertible on $S$. Let $F \in \operatorname {D_{{perf}}}(S)$. Then there is an equivalence

\[ \operatorname{HH}_*(X/S, F) \simeq \bigoplus_{p = 0}^{n} F \otimes f_* \Omega^{p}_{X/S}[p] . \]

4. Hochschild cohomology

In this section we review the definition of Hochschild cohomology and various of its properties relevant to this paper. As in our discussion of Hochschild homology, this material is well known but for convenience we often sketch the details.

Definition 4.1 Let $\mathcal {C}$ be a small or presentable $S$-linear category, and let $F \colon \mathcal {C} \to \mathcal {C}$ be an endomorphism. Then the Hochschild cohomology of $\mathcal {C}$ over $S$ with coefficients in $F$ is the complex

\[ \operatorname{HH}^{*}(\mathcal{C}/S, F) = \mathcal{H}\!{\it om}_S(\mathrm{id}_{\mathcal{C}}, F) \in \operatorname{D_{qc}}(S), \]

that is, the mapping object from $\mathrm {id}_{\mathcal {C}}$ to $F$ considered as objects of the $S$-linear category $\mathrm {Fun}_{S}(\mathcal {C}, \mathcal {C})$. The Hochschild cohomology of $\mathcal {C}$ over $S$ is the complex

\[ \operatorname{HH}^{*}(\mathcal{C}/S) = \operatorname{HH}^{*}(\mathcal{C}/S, \mathrm{id}_{\mathcal{C}}) \in \operatorname{D_{qc}}(S). \]

As for Hochschild homology, if $F \in \operatorname {D_{qc}}(S)$ we use the notation

\begin{align*} \operatorname{HH}^{*}(\mathcal{C}/S, F) = \operatorname{HH}^{*}(\mathcal{C}/S, (- \otimes F)). \end{align*}

Finally, for $i \in \mathbf {Z}$ we set

\begin{align*} \operatorname{HH}^{i}(\mathcal{C}/S, F) = \mathrm{H}^{i}(\operatorname{HH}_*(\mathcal{C}/S, F)) \end{align*}

to be the degree $i$ cohomology sheaf of $\operatorname {HH}^{*}(\mathcal {C}/S,F)$.

Remark 4.2 If $\mathcal {C}$ is a small $S$-linear category and $F \colon \mathcal {C} \to \mathcal {C}$ is an endofunctor, then the Hochschild cohomologies $\operatorname {HH}^{*}(\mathcal {C}, F)$ and $\operatorname {HH}^{*}(\operatorname {Ind}(\mathcal {C}), \operatorname {Ind}(F))$ are canonically equivalent; this follows from the fact that $\operatorname {Ind} \colon \mathrm {Cat}_S \to \mathrm {PrCat}^{\omega }_S$ is an equivalence.

4.1 Functoriality

As recalled in § 3.1, Hochschild homology is functorial with respect to functors that admit a right adjoint. Hochschild cohomology, however, is only functorial with respect to functors which are also fully faithful.

Let $(\mathcal {C}, F)$ be a small or presentable $S$-linear category, and let $F \colon \mathcal {C} \to \mathcal {C}$ be an $S$-linear endofunctor. Let $(\mathcal {D}, G)$ be another such pair. We consider pairs $(\Phi, \delta )$ where $\Phi \colon \mathcal {C} \to \mathcal {D}$ is a morphism that admits a right adjoint morphism $\Phi ^{!} \colon \mathcal {D} \to \mathcal {D}$ (so $\Phi ^{!}$ is required to be cocontinuous in case $\mathcal {C}$ and $\mathcal {D}$ are presentable), and $\delta \colon G \circ \Phi \to \Phi \circ F$ is a natural transformation of functors; in other words, we consider a (not necessarily commutative) diagram

To distinguish from the notion of a morphism $(\mathcal {C}, F) \to (\mathcal {D}, G)$ introduced in § 3.1, we will call such a pair $(\Phi, \delta )$ a comorphism from $(\mathcal {C}, F)$ to $(\mathcal {D}, G)$. We say that $(\Phi, \delta )$ is fully faithful if $\Phi$ is fully faithful.

Now assume that $(\Phi, \delta ) \colon (\mathcal {C}, F) \to (\mathcal {D}, G)$ is a fully faithful comorphism. In this setup, we will construct a morphism

\[ \operatorname{HH}^{*}(\Phi, \delta) \colon \operatorname{HH}^{*}(\mathcal{D}, G) \to \operatorname{HH}^{*}(\mathcal{C}, F) \]

in $\operatorname {D_{qc}}(S)$. By the definition of Hochschild cohomology and Yoneda, it suffices to construct functorially in $A \in \operatorname {D_{qc}}(S)$ a map

\[ \operatorname{Map}_{\mathrm{Fun}_{S}(\mathcal{D}, \mathcal{D})}((- \otimes A), G) \to \operatorname{Map}_{\mathrm{Fun}_{S}(\mathcal{C}, \mathcal{C})}((- \otimes A), F) . \]

For this, we send $\alpha \colon (- \otimes A) \to G$ on the left-hand side to the morphism $(- \otimes A) \to F$ given by the composition

\[ (- \otimes A) \xrightarrow{ \sim } \Phi^{!} \circ \Phi \circ (- \otimes A) \xrightarrow{\sim} \Phi^{!} \circ (- \otimes A) \circ \Phi \xrightarrow{\Phi^{!} \alpha \Phi} \Phi^{!} \circ G \circ \Phi \xrightarrow{\Phi^{!} \delta} \Phi^{!} \circ \Phi \circ F \xrightarrow{\sim} F , \]

where the first and last equivalences come from full faithfulness of $\Phi$ and the second equivalence from the $S$-linearity of $\Phi$.

4.2 Base change

Like Hochschild homology, Hochschild cohomology satisfies base change. This will not be needed in the paper, but we include it for completeness.

Lemma 4.3 Let $\mathcal {C}$ be a dualizable presentable $S$-linear category and let $F \colon \mathcal {C} \to \mathcal {C}$ be an endomorphism. Let $g \colon T \to S$ be a morphism of schemes. Let $F_T \colon \mathcal {C}_T \to \mathcal {C}_T$ be the base change of $F$ along $g$. Then there is a canonical equivalence

\[ g^{*}\operatorname{HH}^{*}(\mathcal{C}/S, F) \simeq \operatorname{HH}^{*}(\mathcal{C}_T/T, F_T) . \]

Proof. We claim that the natural functor

\[ \mathrm{Fun}_{S}(\mathcal{C}, \mathcal{C}) \otimes_{\operatorname{D_{qc}}(S)} \operatorname{D_{qc}}(T) \to \mathrm{Fun}_T(\mathcal{C}_T, \mathcal{C}_T) \]

is an equivalence of $T$-linear categories. From this, the lemma follows from the definition of Hochschild cohomology and base change for mapping objects in linear categories (see [Reference PerryPer19, Lemma 2.10]).

To prove the claim, note that by dualizability of $\mathcal {C}$ we have an equivalence

\[ \mathrm{Fun}_{S}(\mathcal{C}, \mathcal{C}) \simeq \mathcal{C}^{\scriptscriptstyle\vee} \otimes_{\operatorname{D_{qc}}(S)} \mathcal{C} . \]

Base change along $T \to S$ preserves dualizability of $\mathcal {C}$ and $(\mathcal {C}_T)^{\scriptscriptstyle \vee } \simeq (\mathcal {C}^{\scriptscriptstyle \vee })_T$, so we similarly have an equivalence

\begin{align*} \mathrm{Fun}_{T}(\mathcal{C}_T, \mathcal{C}_T) \simeq (\mathcal{C}^{\scriptscriptstyle\vee})_T \otimes_{\operatorname{D_{qc}}(T)} \mathcal{C}_T . \end{align*}

Since these descriptions of the functor categories are compatible with base change along $T$, the claim follows.

4.3 Action on homology

Hochschild cohomology acts on Hochschild homology. More generally, suppose $\mathcal {C}$ is a dualizable presentable $S$-linear category, and $F, G \colon \mathcal {C} \to \mathcal {C}$ are endomorphisms. Then there is an action functor

\begin{align*} \mathcal{H}\!{\it om}_S(F, G) \otimes \operatorname{HH}_*(\mathcal{C}/S, F) \to \operatorname{HH}_*(\mathcal{C}/S, G) \end{align*}

where the first term is the mapping object from $F$ to $G$ in $\mathrm {Fun}_S(\mathcal {C},\mathcal {C})$. This boils down to assigning to any natural transformation $\gamma \colon F \to G$ a morphism $\operatorname {HH}_*(\mathcal {C}/S, F) \to \operatorname {HH}_*(\mathcal {C}/S, G)$; since $(\mathrm {id}_{\mathcal {C}}, \gamma ) \colon (\mathcal {C}, F) \to (\mathcal {C}, G)$ is a morphism of pairs in the sense of § 3.1, we can simply take $\operatorname {HH}_*(\mathrm {id}_{\mathcal {C}}, \gamma )$.

Note that as a particular case, we have an action

\[ \operatorname{HH}^{*}(\mathcal{C}/S, F) \otimes \operatorname{HH}_*(\mathcal{C}/S) \to \operatorname{HH}_*(\mathcal{C}/S, F), \]

and hence for any $i, j \in \mathbf {Z}$ an action

\[ \operatorname{HH}^{i}(\mathcal{C}/S, F) \otimes \operatorname{HH}_{j}(\mathcal{C}/S) \to \operatorname{HH}_{j-i}(\mathcal{C}/S, F). \]

For any $E \in \mathcal {C}$, there is also an evident action

\[ \operatorname{HH}^{*}(\mathcal{C}/S, F) \otimes \mathcal{H}\!{\it om}_S(E,E) \to \mathcal{H}\!{\it om}_S(E,F(E)). \]

Lemma 4.4 For $E \in \mathcal {C}$ the diagram

commutes.

Proof. Using the functoriality of traces (see [Reference Ben-Zvi and NadlerBZN19, Proposition 3.21] or [Reference Kondyrev and PrikhodkoKoPr20, Proposition 1.2.11]), this follows by unwinding the definitions.

4.4 HKR isomorphism

The HKR isomorphism for Hochschild cohomology identifies this group in the case of the derived category of a scheme with polyvector field cohomology. Like the HKR isomorphism for Hochschild homology, the following form of this result can be deduced from [Reference YekutieliYek02]. For a morphism $X \to S$ and an endomorphism $F \colon \operatorname {D_{{perf}}}(X) \to \operatorname {D_{{perf}}}(X)$, we use the notation $\operatorname {HH}^{*}(X/S, F) = \operatorname {HH}^{*}(\operatorname {D_{{perf}}}(X)/S, F)$.

Theorem 4.5 Let $f \colon X \to S$ be smooth morphism of relative dimension $n$, where $n!$ is invertible on $S$. Let $F \in \operatorname {D_{{perf}}}(S)$. Then there is an equivalence

\begin{align*} \operatorname{HH}^{*}(X/S, F) \simeq \bigoplus_{t = 0}^{n} F \otimes f_*(\wedge^{t} \mathrm{T}_{X/S})[-t] . \end{align*}

4.5 Deformation theory

Let $0 \to I \to A' \to A \to 0$ be a square-zero extension of rings, and let $X \to \operatorname {Spec}(A)$ be a smooth morphism of schemes. A deformation of $X$ over $A'$ is a smooth scheme $X'$ over $A'$ equipped with an isomorphism $X'_{A} \cong X$. Recall that, provided one exists, the set of isomorphism classes of such deformations form a torsor under $\mathrm {H}^{1}(X, \mathrm {T}_{X/\operatorname {Spec}(A)} \otimes I)$ (where we abusively write $I$ for the pullback of $I$ to $X$). If $A' \to A$ is a trivial square-zero extension, that is, admits a section $A \to A'$, then there is a trivial deformation $X_{A'}$ obtained by base change along the section, so there is a canonical identification of the set of deformations of $X$ over $A'$ with $\mathrm {H}^{1}(X, \mathrm {T}_{X/\operatorname {Spec}(A)} \otimes I)$ taking the trivial deformation to $0$; in this case, for a deformation $X' \to \operatorname {Spec}(A')$ we write

\[ \kappa(X') \in \mathrm{H}^{1}(X, \mathrm{T}_{X/\operatorname{Spec}(A)} \otimes I) \]

for the corresponding element, called the Kodaira–Spencer class.

We will need a generalization of the Kodaira–Spencer class to the setting of categories. Note that by Theorem 4.5, if $\dim (X/A)!$ is invertible on $A$ (where $\dim (X/A)$ denotes the relative dimension of $X \to \operatorname {Spec}(A)$), then we have an isomorphism

\[ \operatorname{HH}^{2}(X/A, I) \cong \mathrm{H}^{0}(X, \wedge^{2}\mathrm{T}_{X/\operatorname{Spec}(A)} \otimes I) \oplus \mathrm{H}^{1}(X, \mathrm{T}_{X/\operatorname{Spec}(A)} \otimes I) \oplus \mathrm{H}^{2}(X, I) , \]

and, in particular, a natural inclusion

(4.1)\begin{equation} \mathrm{H}^{1}(X, \mathrm{T}_{X/\operatorname{Spec}(A)} \otimes I) \hookrightarrow \operatorname{HH}^{2}(X/A, I). \end{equation}

This suggests that when we replace $X$ by an $A$-linear category, the role of the cohomology of $\mathrm {T}_{X/\operatorname {Spec}(A)}$ in deformation theory should be replaced by Hochschild cohomology.

If $A' \to A$ is a square-zero extension and $\mathcal {C}$ is an $A$-linear category, then a deformation of $\mathcal {C}$ over $A'$ is an $A'$-linear category $\mathcal {C}'$ equipped with an equivalence $\mathcal {C}'_{A} \simeq \mathcal {C}$. If $\Phi \colon \mathcal {C} \to \mathcal {D}$ is a morphism of $A$-linear categories, then a deformation of $\Phi$ over $A'$ is a morphism $\Phi ' \colon \mathcal {C}' \to \mathcal {D}'$ where $\mathcal {C}'$ and $\mathcal {D}'$ are deformations of $\mathcal {C}$ and $\mathcal {D}$ over $A'$ and the base change $\Phi '_{A}$ is equipped with an equivalence $\Phi '_{A} \simeq \Phi$.

Lemma 4.6 Let $0 \to I \to A' \to A \to 0$ be a trivial square-zero extension of rings, and let $\mathcal {C}$ be an $A$-linear category. Then, for any deformation $\mathcal {C}'$ of $\mathcal {C}$ over $A'$, there is an associated Kodaira–Spencer class

\begin{align*} \kappa(\mathcal{C}') \in \operatorname{HH}^{2}(\mathcal{C}/A, I) \end{align*}

with the following properties.

  1. (1) Let $\Phi \colon \mathcal {C} \to \mathcal {D}$ be a fully faithful morphism of $A$-linear categories which admits a right adjoint. Let $\Phi ' \colon \mathcal {C}' \to \mathcal {D}'$ be a deformation of $\Phi$ over $A'$. Then the map

    \[ \operatorname{HH}^{2}(\mathcal{D}/A, I) \to \operatorname{HH}^{2}(\mathcal{C}/A, I) \]
    induced by $\Phi$ (see § 4.1) takes $\kappa (\mathcal {D}')$ to $\kappa (\mathcal {C}')$.
  2. (2) Let $X \to \operatorname {Spec}(A)$ be a smooth morphism of schemes with $\dim (X/A)!$ invertible on $A$. Let $X' \to \operatorname {Spec}(A')$ be a deformation of $X$ over $A'$. Then the inclusion (4.1) takes $\kappa (X')$ to $\kappa (\operatorname {D_{{perf}}}(X'))$.

Proof. In [Reference LurieLur18, § 16.6] the construction of a class $\kappa (\mathcal {C}') \in \operatorname {HH}^{2}(\mathcal {C}/S, I)$ is given in the case where $A = I = k$ are fields, but the same construction works in our more general setting and can be checked to satisfy the stated properties.

More concretely, in this paper we shall only need the class $\kappa (\mathcal {C}')$ for $\mathcal {C} \hookrightarrow \operatorname {D_{{perf}}}(X)$ a semiorthogonal component of a scheme $X$ smooth over $A$ with $\dim (X/A)!$ invertible on $A$, and $\mathcal {C}' \hookrightarrow \operatorname {D_{{perf}}}(X')$ a semiorthogonal component of a deformation of $X$ over $A'$. In this setting, the class $\kappa (\mathcal {C}')$ can be defined by stipulating that properties (1) and (2) hold. Namely, we define $\kappa (\operatorname {D_{{perf}}}(X'))$ as the image of $\kappa (X')$ under the map (4.1), and define $\kappa (\mathcal {C}')$ as the image of $\kappa (\operatorname {D_{{perf}}}(X'))$ under the map $\operatorname {HH}^{2}(\operatorname {D_{{perf}}}(X)/A, I) \to \operatorname {HH}^{2}(\mathcal {C}/A, I)$.

Remark 4.7 In contrast to the geometric situation, in the setting of Lemma 4.6 the set of isomorphism classes of deformations classes of $\mathcal {C}$ over $A'$ is not necessarily a torsor under $\operatorname {HH}^{2}(\mathcal {C}/A, I)$; cf. [Reference LurieLur18, Remark 16.6.7.6 and Theorem 16.6.10.2].

We can also describe the deformation theory of objects along a deformation of a category. If $A' \to A$ is a square-zero extension of rings, $\mathcal {C}$ is an $A$-linear category, $\mathcal {C}'$ is a deformation of $\mathcal {C}$ over $A'$, and $E \in \mathcal {C}$ is an object, then a deformation of $E$ to $\mathcal {C}'$ is an object $E' \in \mathcal {C}'$ equipped with an equivalence $E'_A \simeq E \in \mathcal {C}$ (where we have used the given identification $\mathcal {C}'_A \simeq \mathcal {C}$).

Lemma 4.8 Let $0 \to I \to A' \to A \to 0$ be a square-zero extension of rings. Let $\mathcal {C}$ be an $A$-linear category, $\mathcal {C}'$ a deformation of $\mathcal {C}$ over $A'$, and $E \in \mathcal {C}$ an object. Then there is an obstruction class

\[ \omega(E) \in \operatorname{Ext}^{2}_A(E, E \otimes I) \]

with the following properties.

  1. (1) $\omega (E)$ vanishes if and only if a deformation of $E$ to $\mathcal {C}'$ exists, in which case the set of isomorphism classes of deformations of $E$ to $\mathcal {C}'$ forms a torsor under $\operatorname {Ext}^{1}_A(E, E \otimes I)$.

  2. (2) Assume the extension $A' \to A$ is trivial, so that by Lemma 4.6 we have a Kodaira–Spencer class $\kappa (\mathcal {C}') \in \operatorname {HH}^{2}(\mathcal {C}/A, I)$, which by the definition of Hochschild cohomology corresponds to a natural transformation $\mathrm {id}_{\mathcal {C}} \to (- \otimes I)[2]$. Then, writing $\kappa (\mathcal {C}')(E) \in \operatorname {Ext}_A^{2}(E, E \otimes I)$ for the class obtained by applying this natural transformation to $E$, we have an equality

    \[ \omega(E) = \kappa(\mathcal{C}')(E). \]

Proof. Similarly to Lemma 4.6, the result can be proved using the arguments and results of [Reference LurieLur18, Chapter 16]; cf. [Reference LurieLur18, Remark 16.0.0.3].

More concretely, in this paper we shall only need the result in the case where $\mathcal {C} \hookrightarrow \operatorname {D_{{perf}}}(X)$ is a semiorthogonal component for $X$ a noetherian scheme smooth over $A$, $\mathcal {C}' \hookrightarrow \operatorname {D_{{perf}}}(X')$ is a semiorthogonal component of a deformation $X'$ of $X$ over $A'$, and everything is defined over a base field. In this setting, the result can be proved as follows. First consider the purely geometric case where $\mathcal {C} = \operatorname {D_{{perf}}}(X)$ and $\mathcal {C}' = \operatorname {D_{{perf}}}(X')$. Then [Reference LieblichLie06, Theorem 3.1.1] gives the existence of a class $\omega (E)$ satisfying property (1). If the extension $A' \to A$ is trivial, then by the main theorem of [Reference Huybrechts and ThomasHT10] we haveFootnote 1

\[ \omega(E) = ( \mathrm{id}_{E} \otimes \kappa(X') ) \circ A(E), \]

where $A(E) \in \operatorname {Ext}^{1}(E, E \otimes \Omega _{X/\operatorname {Spec}(A)})$ is the Atiyah class of $E$ and $\kappa (X')$ is regarded as an element of $\operatorname {Ext}^{1}(\Omega _{X/\operatorname {Spec}(A)}, I)$. One checks

\[ ( \mathrm{id}_{E} \otimes \kappa(X') ) \circ A(E) = \kappa(\operatorname{D_{{perf}}}(X))(E) , \]

so that (2) holds. Now the case where $\mathcal {C} \hookrightarrow \operatorname {D_{{perf}}}(X)$ and $\mathcal {C}' \hookrightarrow \operatorname {D_{{perf}}}(X')$ are not necessarily equalities follows from two observations: an object $E'$ is a deformation of $E$ to $\operatorname {D_{{perf}}}(X')$ if and only if $E'$ is a deformation of $E$ to $\mathcal {C}'$; and we have $\kappa (\operatorname {D_{{perf}}}(X))(E) = \kappa (\mathcal {C}')(E)$ by Lemma 4.6(1).

5. Hodge theory of categories

In this section we explain how to associate natural Hodge structures to $\mathbf {C}$-linear categories, via topological K-theory. We use this to formulate several variants of the Hodge conjecture for categories, and discuss the relation between these conjectures and their classical counterparts. We also prove the results about intermediate Jacobians described in § 1.3.

5.1 Topological K-theory

Blanc [Reference BlancBla16] constructed a lax symmetric monoidal topological K-theory functor

\[ \mathrm{K}_{}^{\mathrm{top}} \colon \mathrm{Cat}_{\mathbf{C}} \to \operatorname{Sp} \]

from $\mathbf {C}$-linear categories to the $\infty$-category of spectra. The following theorem summarizes the results about this construction that are relevant to this paper.

Theorem 5.1 [Reference BlancBla16]

  1. (1) If $\mathcal {C} = \left \langle \mathcal {C}_1, \dots, \mathcal {C}_m \right \rangle$ is a semiorthogonal decomposition of $\mathbf {C}$-linear categories, then there is an equivalence

    \begin{align*} \mathrm{K}_{}^{\mathrm{top}}(\mathcal{C}) \simeq \mathrm{K}_{}^{\mathrm{top}}(\mathcal{C}_1) \oplus \cdots \oplus \mathrm{K}_{}^{\mathrm{top}}(\mathcal{C}_m) \end{align*}
    where the map $\mathrm {K}_{}^{\mathrm {top}}(\mathcal {C}) \to \mathrm {K}_{}^{\mathrm {top}}(\mathcal {C}_i)$ is induced by the projection functor onto the component $\mathcal {C}_i$.
  2. (2) There is a functorial commutative square

    (5.1)
    where $\mathrm {K}(\mathcal {C})$ denotes the algebraic K-theory of $\mathcal {C}$, $\operatorname {HN}(\mathcal {C})$ the negative cyclic homology, and $\operatorname {HP}(\mathcal {C})$ the periodic cyclic homology.
  3. (3) If $X$ is a scheme which is separated and of finite type over $\mathbf {C}$ with analytification $X^{\mathrm {an}}$, then there exists a functorial equivalence

    \[ \mathrm{K}_{}^{\mathrm{top}}(\operatorname{D_{{perf}}}(X)) \simeq \mathrm{K}_{}^{\mathrm{top}}(X^{\mathrm{an}}), \]
    where the right-hand side denotes the complex K-theory spectrum of the topological space $X^{\mathrm {an}}$. Under this equivalence, the left vertical arrow in (5.1) recovers the usual map from algebraic K-theory to topological K-theory, and under the identification of $\operatorname {HP}(\operatorname {D_{{perf}}}(X))$ with $2$-periodic de Rham cohomology, the bottom horizontal arrow in (5.1) recovers the usual topological Chern character.

For $\mathcal {C} \in \mathrm {Cat}_{\mathbf {C}}$ and an integer $n$, we write

\[ \mathrm{K}_{n}^{\mathrm{top}}(\mathcal{C}) = \pi_{n} \mathrm{K}_{}^{\mathrm{top}}(\mathcal{C}) \]

for the $n$th homotopy group of $\mathrm {K}_{}^{\mathrm {top}}(\mathcal {C})$. These groups carry canonical pairings in the proper case.

Lemma 5.2 Let $\mathcal {C}$ be a proper $\mathbf {C}$-linear category. Then for any integer $n$ there is a canonical bilinear form $\chi ^{\mathrm {top}}(-,-) \colon \mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}) \otimes \mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}) \to \mathbf {Z}$, called the Euler pairing, with the following properties.

  1. (1) If $\mathcal {C} = \left \langle \mathcal {C}_1, \dots, \mathcal {C}_m \right \rangle$ is a semiorthogonal decomposition of $\mathbf {C}$-linear categories, then the inclusions $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}_i) \to \mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C})$ preserve the Euler pairings, and the direct sum decomposition

    \[ \mathrm{K}_{n}^{\mathrm{top}}(\mathcal{C}) \cong \mathrm{K}_{n}^{\mathrm{top}}(\mathcal{C}_1) \oplus \cdots \oplus \mathrm{K}_{n}^{\mathrm{top}}(\mathcal{C}_m) \]
    is semiorthogonal in the sense that $\chi ^{\mathrm {top}}(v_i, v_j) = 0$ for $v_i \in \mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}_i)$, $v_j \in \mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}_j)$, $i > j$.
  2. (2) If $\chi (-,-) \colon \mathrm {K}_0(\mathcal {C}) \otimes \mathrm {K}_0(\mathcal {C}) \to \mathbf {Z}$ denotes the Euler pairing defined by

    \[ \chi(E,F) = \sum_i (-1)^{i} \dim \operatorname{Ext}_{\mathbf{C}}^{i}(E, F) \]
    for $E , F \in \mathcal {C}$, then the map $\mathrm {K}_0(\mathcal {C}) \to \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$ preserves the Euler pairings.
  3. (3) If $\mathcal {C} = \operatorname {D_{{perf}}}(X)$ for a proper complex variety $X$, then for $v, w \in \mathrm {K}_{n}^{\mathrm {top}}(X)$ we have

    \[ \chi^{\mathrm{top}}(v,w) = p_*(v^{\scriptscriptstyle\vee} \otimes w) \in \mathrm{K}_{2n}^{\mathrm{top}}(\operatorname{Spec}(\mathbf{C}) ) \cong \mathbf{Z} , \]
    where $p \colon X \to \operatorname {Spec}(\mathbf {C})$ is the structure morphism.

Proof. As the functor $\mathrm {K}_{}^{\mathrm {top}} \colon \mathrm {Cat}_{\mathbf {C}} \to \operatorname {Sp}$ is lax monoidal, we have a natural map

\[ \mathrm{K}_{}^{\mathrm{top}}(\mathcal{C}^{\mathrm{op}}) \otimes \mathrm{K}_{}^{\mathrm{top}}(\mathcal{C}) \to \mathrm{K}_{}^{\mathrm{top}}(\mathcal{C}^{\mathrm{op}} \otimes_{\operatorname{D_{{perf}}}(\operatorname{Spec}(\mathbf{C}))} \mathcal{C}). \]

There is a canonical identification $\mathrm {K}_{}^{\mathrm {top}}(\mathcal {C}^{\mathrm {op}}) = \mathrm {K}_{}^{\mathrm {top}}(\mathcal {C})$; indeed, this follows from the definition of $\mathrm {K}_{}^{\mathrm {top}}(-)$ in [Reference BlancBla16] and the corresponding identification for algebraic K-theory. Therefore, passing to homotopy groups, we obtain a map

\[ \mathrm{K}_{n}^{\mathrm{top}}(\mathcal{C}) \otimes \mathrm{K}_{n}^{\mathrm{top}}(\mathcal{C}) \to \mathrm{K}_{2n}^{\mathrm{top}}(\mathcal{C}^{\mathrm{op}} \otimes_{\operatorname{D_{{perf}}}(\operatorname{Spec}(\mathbf{C}))} \mathcal{C}). \]

As $\mathcal {C}$ is proper over $\mathbf {C}$, we have an evaluation functor

\[ \mathcal{C}^{\mathrm{op}} \otimes_{\operatorname{D_{{perf}}}(\operatorname{Spec}(\mathbf{C}))} \mathcal{C} \to \operatorname{D_{{perf}}}(\operatorname{Spec}(\mathbf{C})) \]

induced by the functor $\mathcal {H}\!{\it om}_{\mathbf {C}}(-,-) \colon \mathcal {C}^{\mathrm {op}} \times \mathcal {C} \to \operatorname {D_{{perf}}}(\operatorname {Spec}(\mathbf {C}))$. Taking the topological K-theory of this functor and composing with the above map, we obtain the desired map

\[ \chi^{\mathrm{top}}(-,-) \colon \mathrm{K}_{n}^{\mathrm{top}}(\mathcal{C}) \otimes \mathrm{K}_{n}^{\mathrm{top}}(\mathcal{C}) \to \mathrm{K}_{2n}^{\mathrm{top}}(\operatorname{D_{{perf}}}(\operatorname{Spec}(\mathbf{C}))) \cong \mathbf{Z}. \]

All of the claimed properties follow directly from the definition. For instance, to show the semiorthogonality claimed in (1), note that restriction of the pairing to $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}_i) \otimes \mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}_j)$ is induced by the functor

\[ \mathcal{C}_i^{\mathrm{op}} \otimes_{\operatorname{D_{{perf}}}(\operatorname{Spec}(\mathbf{C}))} \mathcal{C}_j \to \operatorname{D_{{perf}}}(\operatorname{Spec}(\mathbf{C})) , \]

which is in turn induced by the functor $\mathcal {H}\!{\it om}_{\mathbf {C}}(-,-) \colon \mathcal {C}_i^{\mathrm {op}} \times \mathcal {C}_j \to \operatorname {D_{{perf}}}(\operatorname {Spec}(\mathbf {C}))$; but if $i > j$, then this functor vanishes by semiorthogonality.

Remark 5.3 We suspect that if $\mathcal {C}$ is a smooth proper $\mathbf {C}$-linear category, then the Euler pairing on $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C})$ is nondegenerate. As in Lemma 3.6, this (and more) would follow if, for instance, the functor $\mathrm {K}_{}^{\mathrm {top}} \colon \mathrm {Cat}_{\mathbf {C}} \to \operatorname {Sp}$ were monoidal (not only lax monoidal) when restricted to the subcategory of smooth proper $\mathbf {C}$-linear categories.

Proposition 5.4 Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be a $\mathbf {C}$-linear admissible subcategory, where $X$ is a smooth proper complex variety.

  1. (1) For any integer $n$, $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C})$ is a finitely generated abelian group, and there is a canonical Hodge structure of weight $-n$ on $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C})$ such that there is a canonical isomorphism

    \[ \operatorname{gr}^{p}(\mathrm{K}_{n}^{\mathrm{top}}(\mathcal{C}) \otimes \mathbf{C}) \cong \operatorname{HH}_{n+2p}(\mathcal{C}) , \]
    where the left-hand side denotes the $p$th graded piece of the Hodge filtration.
  2. (2) For $\mathcal {C} = \operatorname {D_{{perf}}}(X)$ the Chern character induces an isomorphism

    \[ \mathrm{K}_{n}^{\mathrm{top}}(\operatorname{D_{{perf}}}(X)) \otimes \mathbf{Q} \cong \bigoplus_{k \in \mathbf{Z}} \mathrm{H}^{2k - n}(X, \mathbf{Q})(k) \]
    of rational Hodge structures, where $\mathrm {H}^{2k - n}(X, \mathbf {Q})(k)$ denotes (the Tate twist by $k$ of) the Betti cohomology of $X$.

Remark 5.5 The existence of an admissible embedding $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ in Proposition 5.4 allows us in the proof below to leverage deep results about the Hodge theory of varieties into statements for $\mathcal {C}$. We conjecture, however, that Proposition 5.4 remains true for any smooth proper $\mathbf {C}$-linear category $\mathcal {C}$, without assuming the existence of an embedding.

Proof. First note that $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C})$ is a summand of the finitely generated abelian group $\mathrm {K}_{n}^{\mathrm {top}}(X^{\mathrm {an}})$, and hence finitely generated. The noncommutative Hodge-to-de Rham spectral sequence and its degeneration [Reference KaledinKal08, Reference KaledinKal17, Reference MathewMat20] give a canonical filtration of $\operatorname {HP}_n(\mathcal {C})$ whose $p$th graded piece is $\operatorname {HH}_{n+2p}(\mathcal {C})$. Consider the Chern character map $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}) \otimes \mathbf {C} \to \operatorname {HP}_n(\mathcal {C})$ from Theorem 5.1. We claim that this map is an isomorphism for $\mathcal {C}$ as in the proposition, and the above filtration provides the desired Hodge structure on $\mathcal {C}$. This claim is preserved under passing to semiorthogonal components, so we may assume that $\mathcal {C} = \operatorname {D_{{perf}}}(X)$.

In this case, it is well known that the Chern character indeed provides an isomorphism

\[ \mathrm{K}_{n}^{\mathrm{top}}(\operatorname{D_{{perf}}}(X)) \otimes \mathbf{Q} \cong \bigoplus_{k \in \mathbf{Z}} \mathrm{H}^{2k - n}(X, \mathbf{Q}) \]

of abelian groups. Recall [Reference WeibelWei97] that we have an identification

\[ \operatorname {HP}_n(\operatorname {D_{{perf}}}(X)) \cong \bigoplus _{k \in \mathbf {Z}} \mathrm {H}_{\mathrm {dR}}^{2k-n}(X)\]

with $2$-periodic de Rham cohomology, under which the noncommutative Hodge-to-de Rham filtration agrees with the $2$-periodic Hodge-to-de Rham filtration, that is, the filtration corresponding to the Hodge structure on $\bigoplus _{k \in \mathbf {Z}} \mathrm {H}^{2k - n}(X, \mathbf {Q})(k)$ under the comparison isomorphism $\mathrm {H}^{2k - n}(X, \mathbf {C}) \cong \mathrm {H}_{\mathrm {dR}}^{2k-n}(X)$. We conclude that $\mathrm {K}_{n}^{\mathrm {top}}(\operatorname {D_{{perf}}}(X)) \otimes \mathbf {C} \xrightarrow {\sim } \operatorname {HP}_n(\operatorname {D_{{perf}}}(X))$ is an isomorphism, the noncommutative Hodge-to-de Rham filtration defines a Hodge structure of weight $-n$, and the above isomorphism of abelian groups provided by the Chern character is in fact an isomorphism of rational Hodge structures.

We will need a generalization of Proposition 5.4 to families of categories. This relies on a relative version of Blanc's topological K-theory, due to Moulinos [Reference MoulinosMou19]. Namely, for a scheme $S$ over $\mathbf {C}$, Moulinos constructs a functor

\begin{align*} \mathrm{K}_{}^{\mathrm{top}}(-/S) \colon \mathrm{Cat}_S \to \mathrm{Shv}_{\operatorname{Sp}}(S^{\mathrm{an}}) \end{align*}

from $S$-linear categories to the $\infty$-category of sheaves of spectra on the analytification $S^{\mathrm {an}}$.

Theorem 5.6 [Reference MoulinosMou19]

  1. (1) If $S = \operatorname {Spec}(\mathbf {C})$, then there is an equivalence $\mathrm {K}_{}^{\mathrm {top}}(-/S) \simeq \mathrm {K}_{}^{\mathrm {top}}(-)$.

  2. (2) If $\mathcal {C} = \left \langle \mathcal {C}_1, \dots, \mathcal {C}_m \right \rangle$ is a semiorthogonal decomposition of $S$-linear categories, then there is an equivalence

    \begin{align*} \mathrm{K}_{}^{\mathrm{top}}(\mathcal{C}/S) \simeq \mathrm{K}_{}^{\mathrm{top}}(\mathcal{C}_1/S) \oplus \cdots \oplus \mathrm{K}_{}^{\mathrm{top}}(\mathcal{C}_m/S) \end{align*}
    where the map $\mathrm {K}_{}^{\mathrm {top}}(\mathcal {C}/S) \to \mathrm {K}_{}^{\mathrm {top}}(\mathcal {C}_i/S)$ is induced by the projection functor onto the component $\mathcal {C}_i$.
  3. (3) If $f \colon X \to S$ is a proper morphism of complex varieties and $f^{\mathrm {an}} \colon X^{\mathrm {an}} \to S^{\mathrm {an}}$ is its analytification, then $\mathrm {K}_{}^{\mathrm {top}}(\operatorname {D_{{perf}}}(X)/S)$ is the sheaf of spectra on $S^{\mathrm {an}}$ given by the formula $U \mapsto \mathrm {K}_{}^{\mathrm {top}}((f^{\mathrm {an}})^{-1}(U))$.

For $\mathcal {C} \in \mathrm {Cat}_{S}$ and an integer $n$, we write

\[ \mathrm{K}_{n}^{\mathrm{top}}(\mathcal{C}/S) = \pi_{n} \mathrm{K}_{}^{\mathrm{top}}(\mathcal{C}/S) \]

for the $n$th homotopy sheaf of $\mathrm {K}_{}^{\mathrm {top}}(\mathcal {C}/S)$, which is a sheaf of abelian groups on $S^{\mathrm {an}}$.

Proposition 5.7 Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be an $S$-linear admissible subcategory, where $f \colon X \to S$ is a smooth proper morphism of complex varieties.

  1. (1) For any integer $n$, $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}/S)$ is a local system of finitely generated abelian groups on $S^{\mathrm {an}}$ whose fiber over any point $s \in S(\mathbf {C})$ is $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}_s)$.

  2. (2) $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}/S)$ underlies a canonical variation of Hodge structures of weight $-n$ on $S^{\mathrm {an}}$, which fiberwise for $s \in S(\mathbf {C})$ recovers the Hodge structure on $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}_s)$ from Proposition 5.4.

  3. (3) For $\mathcal {C} = \operatorname {D_{{perf}}}(X)$ there is an isomorphism

    \[ \mathrm{K}_{n}^{\mathrm{top}}(\operatorname{D_{{perf}}}(X)/S) \otimes \mathbf{Q} \cong \bigoplus_{k \in \mathbf{Z}} \mathrm{R}^{2k-n}f^{\mathrm{an}}_* \underline{\mathbf{Q}}(k) \]
    of variations of rational Hodge structures over $S^{\mathrm {an}}$.
  4. (4) There is a bilinear form $\chi ^{\mathrm {top}}(-,-) \colon \mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}/S) \otimes \mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}/S) \to \underline {\mathbf {Z}}$, which fiberwise for complex points $s \in S(\mathbf {C})$ recovers the Euler pairing on $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}_s)$ from Lemma 5.2.

Remark 5.8 Similarly to Remark 5.5, we conjecture that Proposition 5.4 remains true for any smooth proper $S$-linear category.

Proof. As in Proposition 5.4, all of the statements reduce to the case $\mathcal {C} = \operatorname {D_{{perf}}}(X)$, in which case they follow from standard results. For example, let us explain the details of (1). By Ehresmann's theorem and Theorem 5.6(3), $\mathrm {K}_{n}^{\mathrm {top}}(\operatorname {D_{{perf}}}(X)/S)$ is a local system of abelian groups on $S^{\mathrm {an}}$ whose fiber over any point $s \in S(\mathbf {C})$ is $\mathrm {K}_{n}^{\mathrm {top}}(X_s) \simeq \mathrm {K}_{n}^{\mathrm {top}}(\operatorname {D_{{perf}}}(X_s))$. This implies that $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}/S)$ is a local system, being a summand of $\mathrm {K}_{n}^{\mathrm {top}}(\operatorname {D_{{perf}}}(X)/S)$, and by functoriality the fiber of this local system over $s \in S(\mathbf {C})$ is the summand $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C}_s)$ of $\mathrm {K}_{n}^{\mathrm {top}}(\operatorname {D_{{perf}}}(X_s))$.

5.2 The noncommutative Hodge conjecture and its variants

Using the above, we can formulate a natural notion of Hodge classes on a category.

Definition 5.9 Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be a $\mathbf {C}$-linear admissible subcategory, where $X$ is a smooth proper complex variety. The group of integral Hodge classes $\operatorname {Hdg}(\mathcal {C}, \mathbf {Z})$ on $\mathcal {C}$ is the subgroup of Hodge classes in $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$ for the Hodge structure given by Proposition 5.4. More explicitly, $\operatorname {Hdg}(\mathcal {C}, \mathbf {Z})$ consists of all classes in $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$ which map to $\operatorname {HH}_0(\mathcal {C})$ under the Hodge decomposition

\[ \mathrm{K}_{0}^{\mathrm{top}}(\mathcal{C}) \otimes \mathbf{C} \cong \bigoplus_{p+q = 0} \operatorname{HH}_{p-q}(\mathcal{C}) . \]

The group of rational Hodge classes is defined by $\operatorname {Hdg}(\mathcal {C}, \mathbf {Q}) = \operatorname {Hdg}(\mathcal {C}, \mathbf {Z}) \otimes \mathbf {Q}$. We say an element $v \in \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$ is algebraic if it is in the image of $\mathrm {K}_0(\mathcal {C}) \to \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$; similarly, an element $v \in \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}) \otimes \mathbf {Q}$ is algebraic if it is in the image of $\mathrm {K}_0(\mathcal {C}) \otimes \mathbf {Q} \to \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}) \otimes \mathbf {Q}$.

By Proposition 5.4(2), if $X$ is a smooth proper complex variety, then the Chern character identifies $\operatorname {Hdg}(\operatorname {D_{{perf}}}(X), \mathbf {Q})$ with the usual group of rational Hodge classes $\operatorname {Hdg}^{*}(X, \mathbf {Q})$, that is, the group of Hodge classes for $\bigoplus _{k \in \mathbf {Z}} \mathrm {H}^{2k}(X, \mathbf {Q})(k)$. Recall that the cycle class map from the Chow ring

\[ \operatorname{CH}^{*}(X) \otimes \mathbf{Q} \to \mathrm{H}^{*}(X, \mathbf{Q}) \]

factors through $\operatorname {Hdg}^{*}(X, \mathbf {Q})$, and the usual Hodge conjecture predicts that this map surjects onto $\operatorname {Hdg}^{*}(X, \mathbf {Q})$. Since the Chern character gives an isomorphism

\[ \mathrm{K}_0(\operatorname{D_{{perf}}}(X)) \otimes \mathbf{Q} \cong \operatorname{CH}^{*}(X) \otimes \mathbf{Q}, \]

we conclude that the map

\[ \mathrm{K}_0(\operatorname{D_{{perf}}}(X)) \to \mathrm{K}_{0}^{\mathrm{top}}(\operatorname{D_{{perf}}}(X)) \]

factors through $\operatorname {Hdg}(\operatorname {D_{{perf}}}(X), \mathbf {Z})$, and the usual Hodge conjecture is equivalent to the surjectivity of the map $\mathrm {K}_0(\operatorname {D_{{perf}}}(X)) \otimes \mathbf {Q} \to \operatorname {Hdg}(\operatorname {D_{{perf}}}(X), \mathbf {Q})$. Now using additivity under semiorthogonal decompositions of all the invariants in sight leads to the following lemma and conjecture.

Lemma 5.10 Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be a $\mathbf {C}$-linear admissible subcategory, where $X$ is a smooth proper complex variety. Then the map $\mathrm {K}_0(\mathcal {C}) \to \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$ factors through $\operatorname {Hdg}(\mathcal {C}, \mathbf {Z}) \subset \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$.

Conjecture 5.11 (Noncommutative Hodge conjecture)

Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be a $\mathbf {C}$-linear admissible subcategory, where $X$ is a smooth proper complex variety. Then the map

\[ \mathrm{K}_0(\mathcal{C}) \otimes \mathbf{Q} \to \operatorname{Hdg}(\mathcal{C}, \mathbf{Q}) \]

is surjective.

We record the following observation from above.

Lemma 5.12 Let $X$ be a smooth proper complex variety. Then the Hodge conjecture holds for $X$ if and only if the Hodge conjecture holds for $\operatorname {D_{{perf}}}(X)$.

There is also an obvious integral variant of the Hodge conjecture for categories.

Conjecture 5.13 (Noncommutative integral Hodge conjecture)

Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be a $\mathbf {C}$-linear admissible subcategory, where $X$ is a smooth proper complex variety. Then the map

\begin{align*} \mathrm{K}_0(\mathcal{C}) \to \operatorname{Hdg}(\mathcal{C}, \mathbf{Z}) \end{align*}

is surjective.

Remark 5.14 As we explain in Example 5.19 below, Conjecture 5.13 is false in general. Nonetheless, we call it a ‘conjecture’ in keeping with similar terminology for the (known to be false) integral Hodge conjecture for varieties.

The integral Hodge conjectures for varieties and categories are closely related, but not so simply as in the rational case. The result can be conveniently formulated in terms of Voisin groups. Recall from § 1 that for a smooth proper complex variety $X$, the degree $n$ Voisin group $\mathrm {V}^{n}(X)$ is defined as the cokernel of the cycle class map $\operatorname {CH}^{n}(X) \to \operatorname {Hdg}^{n}(X, \mathbf {Z})$.

Definition 5.15 Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be a $\mathbf {C}$-linear admissible subcategory, where $X$ is a smooth proper complex variety. The Voisin group of $\mathcal {C}$ is the cokernel

\[ \mathrm{V}(\mathcal{C}) = \mathrm{coker}(\mathrm{K}_0(\mathcal{C}) \to \operatorname{Hdg}(\mathcal{C}, \mathbf{Z})). \]

Note that the integral Hodge conjecture holds for $\mathcal {C}$ if and only if $\mathrm {V}(\mathcal {C}) = 0$.

Proposition 5.16 Let $X$ be a smooth proper complex variety. Assume that $\mathrm {H}^{*}(X, \mathbf {Z})$ is torsion-free.

  1. (1) If the integral Hodge conjecture holds in all degrees for $X$, then the integral Hodge conjecture holds for $\operatorname {D_{{perf}}}(X)$.

  2. (2) Assume further that for some integer $n$, the cohomology $\mathrm {H}^{2m}(X, \mathbf {Z})$ is of Tate type for all $m > n$, that is, $\mathrm {H}^{2m}(X, \mathbf {C}) = \mathrm {H}^{m,m}(X)$ for $m > n$. If $\mathrm {V}(\operatorname {D_{{perf}}}(X))$ is $d$-torsion for some integer $d$, then the $\mathrm {V}^{m}(X)$ is $d (m-1)!$-torsion for all $m \geq n$. In particular, if $n = 2$ and the integral Hodge conjecture holds for $\operatorname {D_{{perf}}}(X)$, then the integral Hodge conjecture in degree $2$ holds for $X$.

Proof. For the proof we will need the following properties, which hold by [Reference Atiyah and HirzebruchAH61, § 2.5] due to our assumption that $\mathrm {H}^{*}(X, \mathbf {Z})$ is torsion-free.

  1. (1) $\mathrm {K}_{0}^{\mathrm {top}}(X)$ is torsion-free and $\operatorname {ch} \colon \mathrm {K}_{0}^{\mathrm {top}}(X) \to \mathrm {H}^{\mathrm {even}}(X, \mathbf {Q})$ is injective.

  2. (2) For any $v \in \mathrm {K}_{0}^{\mathrm {top}}(X)$ the leading term of $\operatorname {ch}(v)$ is integral, that is, if $\operatorname {ch}(v) = \alpha _i + \alpha _{i+1} + \cdots$ with $\alpha _j \in \mathrm {H}^{2j}(X, \mathbf {Q})$ then $\alpha _i \in \mathrm {H}^{2i}(X, \mathbf {Z})$.

  3. (3) For any $\alpha _i \in \mathrm {H}^{2i}(X, \mathbf {Z})$ there exists $v \in \mathrm {K}_{0}^{\mathrm {top}}(X)$ such that the leading term of $\operatorname {ch}(v)$ is $\alpha _i$.

(The analogous assertions relating $\mathrm {K}_{1}^{\mathrm {top}}(X)$ and the odd cohomology of $X$ are also true, but we will not need this.)

Now assume that the integral Hodge conjecture holds in all degrees for $X$. We must show that any $v \in \operatorname {Hdg}(\operatorname {D_{{perf}}}(X), \mathbf {Z})$ is in the image of $\mathrm {K}_0(\operatorname {D_{{perf}}}(X))$. Write $\operatorname {ch}(v) = \alpha _i + \alpha _{i+1} + \cdots$ as above. Then $\alpha _i$ is a Hodge class by Proposition 5.4(2) and integral by property (2) above, that is, $\alpha _i \in \operatorname {Hdg}^{i}(X, \mathbf {Z})$. Therefore, by assumption there are closed subvarieties $Z_k \subset X$ of codimension $i$ and integers $c_k \in \mathbf {Z}$ such that $\alpha _i$ is the cycle class of $\sum c_k Z_k$. Replacing $v$ by $v - \sum c_k [\mathcal {O}_{Z_k}]$, we may thus assume $\alpha _i = 0$. Continuing in this way, we may assume that $\operatorname {ch}(v) = 0$. But then $v = 0$ by property (1) above, so we are done. This proves part (1) of the proposition.

Now assume that the cohomological condition in part (2) of the proposition holds, and that $\mathrm {V}(\operatorname {D_{{perf}}}(X))$ is $d$-torsion. Let $m \geq n$ and $\alpha _m \in \operatorname {Hdg}^{m}(X,\mathbf {Z})$. By property (3) above we may choose a class $v \in \mathrm {K}_{0}^{\mathrm {top}}(X)$ such that $\operatorname {ch}(v) = \alpha _m + \alpha _{m+1} + \cdots$ where $\alpha _i \in \mathrm {H}^{2i}(X, \mathbf {Q})$. By assumption $\alpha _m$ is a Hodge class, and so is $\alpha _i$ for $i > m$ because $\mathrm {H}^{2i}(X, \mathbf {Z})$ is of Tate type. Thus $v \in \operatorname {Hdg}(\operatorname {D_{{perf}}}(X), \mathbf {Z})$ is a Hodge class by Proposition 5.4(2). Therefore, by assumption there is an object $E \in \operatorname {D_{{perf}}}(X)$ whose class in $\mathrm {K}_{0}^{\mathrm {top}}(X)$ is $dv$, and so $\operatorname {ch}(E) = d\alpha _{m} + d\alpha _{m+1} + \cdots$. By the standard formula for the Chern character in terms of Chern classes, the vanishing of $\operatorname {ch}_i(E)$ for $i < m$ implies that $d\alpha _m = ({(-1)^{m-1}}/{(m-1)!}) c_m(E)$ in $\mathrm {H}^{2m}(X, \mathbf {Q})$. By torsion-freeness of $\mathrm {H}^{2m}(X, \mathbf {Z})$, this is equivalent to $d(m-1)! \alpha _m = (-1)^{m-1}c_m(E)$ in $\mathrm {H}^{2m}(X, \mathbf {Z})$. This proves that $d(m-1)!$ kills the class of $\alpha _m$ in the cokernel of $\operatorname {CH}^{m}(X) \to \operatorname {Hdg}^{m}(X, \mathbf {Z})$, as required.

Corollary 5.17 Let $X$ be a smooth proper complex variety with $\dim (X) \leq 2$, and assume $\mathrm {H}^{*}(X, \mathbf {Z})$ is torsion-free in the case where $\dim (X) = 2$. Then the integral Hodge conjecture holds for $\operatorname {D_{{perf}}}(X)$.

Proof. This follows from Proposition 5.16(1) because the integral Hodge conjecture holds for varieties of dimension at most $2$.

Corollary 5.18 Let $X$ be a smooth proper complex threefold with $\mathrm {H}^{*}(X, \mathbf {Z})$ torsion-free. Then the integral Hodge conjecture holds for $X$ if and only if the integral Hodge conjecture holds for $\operatorname {D_{{perf}}}(X)$.

Proof. For a threefold the integral Hodge conjecture always holds in degrees $n=0,1,3$, so the only interesting case is $n = 2$. Thus the result follows from Proposition 5.16.

Example 5.19 Let $X \subset \mathbf {P}^{4}$ be a very general complex hypersurface of degree divisible by $p^{3}$ for an integer $p$ coprime to $6$. Then Kollár showed that the integral Hodge conjecture in degree $2$ fails for $X$ [Reference Ballico, Catanese and CilibertoBCC92]. By Corollary 5.18 we conclude that the integral Hodge conjecture also fails for $\operatorname {D_{{perf}}}(X)$.

The (integral) Hodge conjecture for categories behaves well under semiorthogonal decompositions. This will be important in our applications to the integral Hodge conjecture for varieties with CY2 semiorthogonal components.

Lemma 5.20 Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be a $\mathbf {C}$-linear admissible subcategory, where $X$ is a smooth proper complex variety. Let $\mathcal {C} = \left \langle \mathcal {C}_1, \dots, \mathcal {C}_m \right \rangle$ be a $\mathbf {C}$-linear semiorthogonal decomposition. Then there is an isomorphism of Voisin groups

\[ \mathrm{V}(\mathcal{C}) \cong \mathrm{V}(\mathcal{C}_1) \oplus \cdots \oplus \mathrm{V}(\mathcal{C}_{m}) . \]

In particular, the (integral) Hodge conjecture holds for $\mathcal {C}$ if and only if the (integral) Hodge conjecture holds for all of the semiorthogonal components $\mathcal {C}_1, \dots, \mathcal {C}_m$.

Proof. This follows immediately from the fact that all of the invariants involved in the definition of $\mathrm {V}(\mathcal {C})$ are additive under semiorthogonal decompositions.

We can also formulate a version of the variational Hodge conjecture for categories.

Conjecture 5.21 (Noncommutative variational Hodge conjecture)

Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be an $S$-linear admissible subcategory, where $f \colon X \to S$ is a smooth proper morphism of complex varieties. Let $\varphi$ be a section of the local system $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S) \otimes \mathbf {Q}$ of $\mathbf {Q}$-vector spaces on $S^{\mathrm {an}}$. Assume there exists a complex point $0 \in S(\mathbf {C})$ such that the fiber $\varphi _0 \in \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}_0) \otimes \mathbf {Q}$ is algebraic. Then $\varphi _s$ is algebraic for every $s \in S(\mathbf {C})$.

Note that, as in Lemma 5.12, for $\mathcal {C} = \operatorname {D_{{perf}}}(X)$ the noncommutative variational Hodge conjecture is equivalent to the usual variational Hodge conjecture. In general, this conjecture is extremely difficult. One of the main results of this paper, Theorem 1.3, is an integral version of the noncommutative variational Hodge conjecture for families of CY2 categories.

We note that, using deep known results for varieties, it is easy to prove the statement obtained by replacing ‘algebraic’ with ‘Hodge’ in the noncommutative variational Hodge conjecture.

Lemma 5.22 Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be an $S$-linear admissible subcategory, where $f \colon X \to S$ is a smooth proper morphism of complex varieties. Let $\varphi$ be a section of the local system of $\mathbf{Q}$-vector spaces $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S) \otimes \mathbf {Q}$ on $S^{\mathrm {an}}$. Assume there exists a complex point $0 \in S(\mathbf {C})$ such that the fiber $\varphi _0 \in \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}_0) \otimes \mathbf {Q}$ is a Hodge class. Then $\varphi _s$ is a Hodge class for every $s \in S(\mathbf {C})$.

Proof. As in earlier arguments, we may reduce to the case where $\mathcal {C} = \operatorname {D_{{perf}}}(X)$. Then in view of the isomorphism of Proposition 5.7(3), this is a well-known consequence of Deligne's global invariant cycle theorem; see [Reference Charles and SchnellCS14, Proposition 11.3.5].

5.3 Odd-degree cohomology and intermediate Jacobians

The following gives conditions under which the odd topological K-theory of categories recovers the odd integral cohomology of varieties. For an abelian group $A$, we write $A_{\mathrm {tf}}$ for the quotient by its torsion subgroup.

Proposition 5.23 Let $X$ be a smooth proper complex variety of odd dimension $n$, such that $\mathrm {H}^{k}(X, \mathbf {Z}) = 0$ for all odd $k < n$. Let $\operatorname {D_{{perf}}}(X) = \left \langle \mathcal {C}_1, \dots, \mathcal {C}_m \right \rangle$ be a semiorthogonal decomposition. Then the Chern character induces an isometry of weight $n$ Hodge structures

\[ \operatorname{ch} \colon \mathrm{K}_{-n}^{\mathrm{top}}(\mathcal{C}_1)_{\mathrm{tf}} \oplus \cdots \oplus \mathrm{K}_{-n}^{\mathrm{top}}(\mathcal{C}_m)_{\mathrm{tf}} \xrightarrow{\sim} \mathrm{H}^{n}(X, \mathbf{Z})_{\mathrm{tf}} \]

where the left-hand side is the orthogonal sum of the Hodge structures $\mathrm {K}_{-n}^{\mathrm {top}}(\mathcal {C}_i)_{\mathrm {tf}}$ of Proposition 5.4 equipped with their Euler pairings of Lemma 5.2, and the right-hand side is equipped with its standard Hodge structure and pairing. If, moreover, $\mathrm {H}^{k}(X, \mathbf {Z}) = 0$ for all odd $k \neq n$, then the above isomorphism holds before quotienting by torsion, that is,

\[ \mathrm{K}_{-n}^{\mathrm{top}}(\mathcal{C}_1) \oplus \cdots \oplus \mathrm{K}_{-n}^{\mathrm{top}}(\mathcal{C}_m) \xrightarrow{\sim} \mathrm{H}^{n}(X, \mathbf{Z}) . \]

Proof. If the decomposition of $\operatorname {D_{{perf}}}(X)$ is trivial (i.e. $m = 1$), then the result holds by (the proof of) [Reference Ottem and RennemoOR18, Proposition 2.1 and Remark 2.3]. The general case follows from additivity of the invariants involved under semiorthogonal decompositions. The only point requiring explanation is that the direct sum decomposition is orthogonal for the Euler pairing. By Lemma 5.2 the sum is semiorthogonal. By the $m = 1$ case we have a Hodge isometry $\mathrm {K}_{-n}^{\mathrm {top}}(\operatorname {D_{{perf}}}(X))_{\mathrm {tf}} \cong \mathrm {H}^{n}(X, \mathbf {Z})_{\mathrm {tf}}$ where the left-hand side is equipped with the Euler pairing and the right-hand side with the usual pairing on cohomology. But the pairing on $\mathrm {H}^{n}(X, \mathbf {Z})_{\mathrm {tf}}$ is anti-symmetric, so the same is true of the Euler pairing, and orthogonality of the direct sum decomposition follows from semiorthogonality.

Recall that if $H$ is a Hodge structure of odd weight $n$, then its intermediate Jacobian is

\[ J(H) = \frac{H_{\mathbf{C}}}{F^{{(n+1)}/{2}}(H_{\mathbf{C}}) \oplus H_{\mathbf{Z}} }, \]

where $H_{\mathbf {Z}}$ is the underlying abelian group of $H$, $H_{\mathbf {C}}$ is its complexification, and $F^{\bullet }(H_{\mathbf {C}})$ is the Hodge filtration. In general, $J(H)$ only has the structure of a complex torus, but if $H$ is polarized and its Hodge decomposition only has two terms (i.e. $H_{\mathbf {C}} = H^{p,q} \oplus H^{q,p}$ for some $p,q$), then $J(H)$ is a principally polarized abelian variety. If $X$ is a smooth proper complex variety, for an odd integer $k$ we write $J^{k}(X)$ for the intermediate Jacobian associated to the Hodge structure $\mathrm {H}^{k}(X, \mathbf {Z})$.

Definition 5.24 Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be a $\mathbf {C}$-linear admissible subcategory, where $X$ is a smooth proper complex variety. The intermediate Jacobian of $\mathcal {C}$ is the complex torus

\[ J(\mathcal{C}) = J(\mathrm{K}_{1}^{\mathrm{top}}(\mathcal{C})) \]

given by the intermediate Jacobian of the weight $-1$ Hodge structure $\mathrm {K}_{1}^{\mathrm {top}}(\mathcal {C})$.

Remark 5.25 For any odd integer $n$, we can also consider the intermediate Jacobian of $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C})$. However, these are all isomorphic for varying odd $n$, because by 2-periodicity of topological K-theory the Hodge structures $\mathrm {K}_{n}^{\mathrm {top}}(\mathcal {C})$ are Tate twists of each other.

Using Proposition 5.23, we can prove Theorem 1.6 and Corollary 1.7.

Proof of Theorem 1.6 By Proposition 5.23 and our assumptions on the cohomology of $X$ and $Y_i$, we have isomorphisms $J(\operatorname {D_{{perf}}}(X)) \cong J^{n}(X)$ and $J(\operatorname {D_{{perf}}}(Y_i)) \cong J^{n_i}(Y_i)$ if $n_i$ is odd. Moreover, Proposition 5.4(2) and our cohomological assumption imply that if $n_i$ is even then $\mathrm {K}_{1}^{\mathrm {top}}(\operatorname {D_{{perf}}}(Y_i))$ is torsion, so $J(\operatorname {D_{{perf}}}(Y_i)) = 0$. Thus, by Proposition 5.23 applied to the semiorthogonal decomposition of $\operatorname {D_{{perf}}}(X)$, we obtain an isomorphism of complex tori

(5.2)\begin{equation} J^{n}(X) \cong \bigoplus_{n_i \, \mathrm{odd}} J^{n_i}(Y_i) . \end{equation}

Under the further assumption that $\mathrm {H}^{n_i}(Y_i, \mathbf {C}) = \mathrm {H}^{p_i, q_i}(Y_i) \oplus \mathrm {H}^{q_i, p_i}(Y_i)$, the HKR isomorphism shows that $\mathrm {H}^{n}(X, \mathbf {C}) = \mathrm {H}^{p,q}(X) \oplus \mathrm {H}^{q,p}(X)$, where $p_i, q_i, p, q$ are as in the statement of Theorem 1.6. The fact that the isomorphisms of Proposition 5.23 respect the pairings on each side then implies that the above isomorphism (5.2) respects the principal polarizations on each side.

Proof of Corollary 1.7 Note that the category $\left \langle E_j \right \rangle \subset \operatorname {D_{{perf}}}(X)$ generated by $E_j$ is equivalent to $\operatorname {D_{{perf}}}(\operatorname {Spec}(\mathbf {C}))$. Hence the first part of Corollary 1.7 is just a special case of Theorem 1.6. Under the further assumption that $\mathrm {H}^{5}(X, \mathbf {Z}) = 0$, we can apply the second part of Proposition 5.23 (and the $2$-periodicity of $\mathrm {K}_{n}^{\mathrm {top}}(-)$) to conclude there are isomorphisms

\begin{align*} \mathrm{H}^{3}(X, \mathbf{Z}) & \cong \mathrm{K}_{-3}^{\mathrm{top}}(\operatorname{D_{{perf}}}(X)) \\ & \cong \mathrm{K}_{-3}^{\mathrm{top}}(\operatorname{D_{{perf}}}(C_1)) \oplus \cdots \oplus \mathrm{K}_{-3}^{\mathrm{top}}(\operatorname{D_{{perf}}}(C_r)) \\ & \cong \mathrm{H}^{1}(C_1, \mathbf{Z}) \oplus \cdots \oplus \mathrm{H}^{1}(C_r, \mathbf{Z}). \end{align*}

In particular, $\mathrm {H}^{3}(X, \mathbf {Z})_{\mathrm {tors}} = 0$.

Example 5.26 Let $V_6$ be a six-dimensional vector space, and consider the Plücker embedded Grassmannian $\mathrm {Gr}(2,V_6) \subset \mathbf {P}(\wedge ^{2}V_6)$ and the Pfaffian cubic hypersurface $\mathrm {Pf}(4, V_6^{\scriptscriptstyle \vee }) \subset \mathbf {P}(\wedge ^{2} V_6^{\scriptscriptstyle \vee })$ parameterizing forms of rank at most $4$. Let $L \subset \wedge ^{2}V_6$ be a codimension $3$ linear subspace, and let $L^{\perp } = \ker (\wedge ^{2}V_6^{\scriptscriptstyle \vee } \to L^{\scriptscriptstyle \vee })$ be its orthogonal. We assume $L$ is generic so that the intersections

\[ X_L = \mathrm{Gr}(2, V_6) \cap \mathbf{P}(L) \quad \text{and} \quad Y_L = \mathrm{Pf}(4, V_6^{\scriptscriptstyle\vee}) \cap \mathbf{P}(L^{\perp}) \]

are smooth of expected dimension, in which case $X_L$ is a Fano fivefold and $Y_L$ is an elliptic curve. Then there is an isomorphism

(5.3)\begin{equation} J^{5}(X_L) \cong J^{1}(Y_L) \end{equation}

of principally polarized abelian varieties. Indeed, by [Reference KuznetsovKuz06a, § 10] there is a semiorthogonal decomposition of $\operatorname {D_{{perf}}}(X_L)$ consisting of $\operatorname {D_{{perf}}}(Y_L)$ and exceptional objects, and by the Lefschetz hyperplane theorem $\mathrm {H}^{k}(X_L, \mathbf {Z}) = 0$ for all odd $k < 5$, so Theorem 1.6 gives the result.

Remark 5.27 In [Reference Bernardara and TabuadaBT16] Bernardara and Tabuada give criteria for relating the intermediate Jacobians of varieties whose derived categories share a semiorthogonal component, but their criteria are quite restrictive and difficult to verify, especially in dimension $5$ and higher. In particular, they were unable to prove the isomorphism (5.3) (see [Reference Bernardara and TabuadaBT16, Remark 1.18]).

Homological projective geometry [Reference KuznetsovKuz07, Reference Jiang, Leung and XieJLX21, Reference Kuznetsov and PerryKuPe21, Reference Kuznetsov and PerryKuPe19] is a general theory for producing varieties whose derived categories have a semiorthogonal component in common, and gives many examples to which our methods apply. Example 5.26 is a simple instance of this. To explain a more interesting example, we need some terminology.

Definition 5.28 A Gushel–Mukai variety is a smooth $n$-dimensional intersection

\[ X = \operatorname{Cone}(\mathrm{Gr}(2,5)) \cap Q, \quad 2 \leq n \leq 6 , \]

where $\operatorname {Cone}(\mathrm {Gr}(2,5)) \subset \mathbf {P}^{10}$ is the projective cone over the Plücker embedded Grassmannian $\mathrm {Gr}(2,5) \subset \mathbf {P}^{9}$ and $Q \subset \mathbf {P}^{10}$ is a quadric hypersurface in a linear subspace $\mathbf {P}^{n+4} \subset \mathbf {P}^{10}$.

The results of Gushel [Reference Gushel’Gus83] and Mukai [Reference MukaiMuk89] show these varieties coincide with the class of all smooth Fano varieties of Picard number $1$, coindex $3$, and degree $10$ (corresponding to $n \geq 3$), together with the Brill–Noether general polarized K3 surfaces of degree $10$ (corresponding to $n = 2$). Recently, GM varieties have attracted attention because of the rich structure of their birational geometry, Hodge theory, and derived categories [Reference Debarre, Iliev and ManivelDIM12, Reference Iliev and ManivelIM11, Reference Debarre, Iliev and ManivelDIM15, Reference Debarre and KuznetsovDK18, Reference Debarre and KuznetsovDK20b, Reference Debarre and KuznetsovDK19, Reference Debarre and KuznetsovDK20a, Reference Kuznetsov and PerryKuPe18, Reference Perry, Pertusi and ZhaoPPZ19].

In [Reference Debarre and KuznetsovDK18] Debarre and Kuznetsov classified GM varieties in terms of linear algebraic data, by constructing for any GM variety $X$ a Lagrangian data set $(V_6(X), V_5(X), A(X))$, where

  • $V_6(X)$ is a six-dimensional vector space,

  • $V_5(X) \subset V_6(X)$ is a hyperplane, and

  • $A(X) \subset \wedge ^{3} V_6(X)$ is a Lagrangian subspace with respect to the wedge product,

and proving that $X$ is completely determined by its dimension and these data. Interestingly, many of the properties of $X$ only depend on $A(X)$. To state such a result for intermediate Jacobians, recall that if $X_1$ and $X_2$ are GM varieties such that $\dim (X_1) \equiv \dim (X_2) \pmod 2$, then they are called generalized partners if there exists an isomorphism $V_6(X_1) \cong V_6(X_2)$ identifying $A(X_1) \subset \wedge ^{3} V_6(X_1)$ with $A(X_2) \subset \wedge ^{3}V_6(X_2)$, or generalized duals if there exists an isomorphism $V_6(X_1) \cong V_6(X_2)$ identifying $A(X_1) \subset \wedge ^{3} V_6(X_1)$ with $A(X_2)^{\perp } \subset \wedge ^{3}V_6(X_2)^{\scriptscriptstyle \vee }$. For a GM variety of odd dimension $n$, we have $\mathrm {H}^{n}(X, \mathbf {C}) = \mathrm {H}^{p,q}(X) \oplus \mathrm {H}^{q,p}(X)$ where $p-q =1$ and $\mathrm {H}^{p,q}(X)$ is $10$-dimensional [Reference Debarre and KuznetsovDK19, Proposition 3.1], so $J^{n}(X)$ is a $10$-dimensional principally polarized abelian variety.

Theorem 5.29 [Reference Debarre and KuznetsovDK20a]

Let $X_1$ and $X_2$ be GM varieties of odd dimensions $n_1$ and $n_2$ which are generalized partners or duals. Then there is an isomorphism

\begin{align*} J^{n_1}(X_1) \cong J^{n_2}(X_2) \end{align*}

of principally polarized abelian varieties.

This is proved in [Reference Debarre and KuznetsovDK20a] by intricate geometric arguments, but, as we explain now, it can be deduced as a consequence of a categorical statement. Recall that by [Reference Kuznetsov and PerryKuPe18], for any GM variety there is a Kuznetsov component $\mathcal {K}u(X) \subset \operatorname {D_{{perf}}}(X)$ defined by the semiorthogonal decomposition

(5.4)\begin{equation} \operatorname{D_{{perf}}}(X) = \left \langle \mathcal {K}u(X), \mathcal{O}_X, \mathcal{U}_X^{\vee}, \dots, \mathcal{O}_X(\dim(X)-3), \mathcal{U}_X^{\vee}(\dim(X)-3) \right \rangle , \end{equation}

where $\mathcal {U}_X$ and $\mathcal {O}_X(1)$ denote the pullbacks to $X$ of the rank $2$ tautological subbundle and Plücker line bundle on $\mathrm {Gr}(2,5)$.

Lemma 5.30 Let $X$ be a GM variety of odd dimension $n$. Then there is an isomorphism

\begin{align*} J^{n}(X) \cong J(\mathcal {K}u(X)) \end{align*}

of principally polarized abelian varieties.

Proof. The Lefschetz hyperplane theorem implies $\mathrm {H}^{k}(X, \mathbf {Z}) = 0$ for all odd $k < n$, so the result follows from Proposition 5.23.

Proof of Theorem 5.29 By [Reference Debarre and KuznetsovDK18, Theorem 3.16] for a GM variety $X$ of dimension at least $3$, the associated Lagrangian subspace $A(X)$ does not contain decomposable vectors. Hence we may apply the duality conjecture [Reference Kuznetsov and PerryKuPe18, Conjecture 3.7] proved in [Reference Kuznetsov and PerryKuPe19, Theorem 1.6] to conclude there is an equivalence $\mathcal {K}u(X_1) \simeq \mathcal {K}u(X_2)$. Now the result follows from Lemma 5.30.

Remark 5.31 In [Reference Debarre and KuznetsovDK19] an analogue of Theorem 5.29 is proved for even-dimensional GM varieties, asserting that generalized partners or duals have the same period. This can also be reproved categorically by a more elaborate version of the above argument, as explained in [Reference Bayer and PerryBP22].

6. CY2 categories

In this section we define CY2 categories and their associated Mukai Hodge structures, and survey the known examples of CY2 categories. We also give a sample application of the results of § 5 to torsion orders of Voisin groups (Corollary 6.14).

6.1 Definitions

Definition 6.1 A CY2 category over a field $k$ is a $k$-linear category $\mathcal {C}$ such that:

  1. (1) there exists an admissible $k$-linear embedding $\mathcal {C} \hookrightarrow \operatorname {D_{{perf}}}(X)$, where $X$ is a smooth proper variety over $k$;

  2. (2) the shift functor $[2]$ is a Serre functor for $\mathcal {C}$ over $k$;

  3. (3) the Hochschild cohomology of $\mathcal {C}$ satisfies $\operatorname {HH}^{0}(\mathcal {C}/k) = k$.

More generally, a CY2 category over a scheme $S$ is an $S$-linear category $\mathcal {C}$ such that:

  1. (1) there exists an admissible $S$-linear embedding $\mathcal {C} \hookrightarrow \operatorname {D_{{perf}}}(X)$, where $X \to S$ is a smooth proper morphism;

  2. (2) for every point $s \colon \operatorname {Spec}(k) \to S$, the fiber $\mathcal {C}_s$ is a CY2 category over $k$.

Remark 6.2 Condition (1) in the definition of a CY2 category over a field or scheme says that $\mathcal {C}$ ‘comes from geometry’. For all of the results in this paper, it would be enough to instead assume that $\mathcal {C}$ is smooth and proper and the conclusions of Propositions 5.4 and 5.7 hold; cf. Remarks 5.5 and 5.8. On the other hand, condition (1) will be automatic in the examples we consider in the paper.

Remark 6.3 Let us explain the motivation for the other conditions appearing in the definition of a CY2 category $\mathcal {C}$ over $k$.

Condition (2), the most important part of the definition of a CY2 category, says that from the perspective of Serre duality, $\mathcal {C}$ behaves like the derived category of a smooth proper surface with trivial canonical bundle, that is, a two-dimensional Calabi–Yau variety.

Condition (3) says that $\mathcal {C}$ is connected in the sense of [Reference KuznetsovKuz19]. The source of this terminology is the observation that for a smooth proper variety $X$ over $k$, we have $\operatorname {HH}^{0}(X/k) = \mathrm {H}^{0}(X, \mathcal {O}_X)$, so $X$ is connected if and only if $\operatorname {HH}^{0}(X/k) = k$. Note also that by Lemma 3.7 and condition (2) we have $\operatorname {HH}^{0}(\mathcal {C}/k) \cong \operatorname {HH}_2(\mathcal {C}/k)$, and by Lemma 3.6 we have $\operatorname {HH}_2(\mathcal {C}/k) \cong \operatorname {HH}_{-2}(\mathcal {C}/k)$; thus condition (3) amounts to $\operatorname {HH}_2(\mathcal {C}/k)$, or equivalently $\operatorname {HH}_{-2}(\mathcal {C}/k)$, being a one-dimensional $k$-vector space.

Definition 6.4 Let $\mathcal {C}$ be a CY2 category over $\mathbf {C}$. The Mukai Hodge structure of $\mathcal {C}$ is the weight $2$ Hodge structure $\widetilde {\mathrm {H}}(\mathcal {C}, \mathbf {Z}) = \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})(-1)$, where $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C})$ is endowed with the weight $0$ Hodge structure from Proposition 5.4 and $(-1)$ denotes a Tate twist. We equip $\widetilde {\mathrm {H}}(\mathcal {C}, \mathbf {Z})$ with the bilinear form $(-,-) = - \chi ^{\mathrm {top}}(-,-)$ given by the negative of the Euler pairing.

More generally, if $\mathcal {C}$ is a CY2 category over a complex variety $S$, then the Mukai local system is defined by $\widetilde {\mathrm {H}}(\mathcal {C}/S, \mathbf {Z}) = \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S)(-1)$, which by Proposition 5.7 is equipped with the structure of a variation of Hodge structures which fiberwise for $s \in S(\mathbf {C})$ recovers the Mukai Hodge structure $\widetilde {\mathrm {H}}(\mathcal {C}_s, \mathbf {Z})$.

The Tate twist in the definition is included for historical reasons; see Remark 6.6 below.

6.2 Examples

The main known examples of CY2 categories are as follows. For simplicity, we will work over the complex numbers, but all of the examples also work over a field of sufficiently large characteristic. We focus on the absolute case, but all of the constructions also work in families to give examples of CY2 categories over a base scheme, as we explain in a particular case in Example 6.7.

Example 6.5 (K3 and abelian surfaces)

Let $T$ be a smooth connected proper surface with trivial canonical bundle, that is, a K3 or abelian surface. Then $\operatorname {D_{{perf}}}(T)$ is a CY2 category. Indeed, condition (1) of Definition 6.1 is obvious, condition (2) holds since $T$ has trivial canonical bundle, and condition (3) holds since $T$ is connected (see Remark 6.3). More generally, if $T$ is equipped with a Brauer class $\alpha \in \operatorname {Br}(T)$, then the twisted derived category $\operatorname {D_{{perf}}}(T, \alpha )$ is a CY2 category.

Remark 6.6 For $T$ as above there is an isomorphism $\mathrm {K}_{0}^{\mathrm {top}}(T) \cong \mathrm {H}^{\mathrm {even}}(T, \mathbf {Z})$ which is given by $v \mapsto \operatorname {ch}(v) \operatorname {td}(T)^{1/2}$. This isomorphism identifies $\widetilde {\mathrm {H}}(\operatorname {D_{{perf}}}(T), \mathbf {Z})$, equipped with its weight $2$ Hodge structure and pairing from Definition 6.4, with the classically defined Mukai Hodge structure on $\mathrm {H}^{\mathrm {even}}(T, \mathbf {Z})$. Similarly, $\widetilde {\mathrm {H}}(\operatorname {D_{{perf}}}(T, \alpha ), \mathbf {Z})$ recovers the usual Mukai Hodge structure in the twisted case.

Example 6.7 (Cubic fourfolds)

Let $X \subset \mathbf {P}^{5}$ be a cubic fourfold, that is, a smooth cubic hypersurface. The Kuznetsov component $\mathcal {K}u(X) \subset \operatorname {D_{{perf}}}(X)$ is the subcategory defined by the semiorthogonal decomposition

\[ \operatorname{D_{{perf}}}(X) = \left \langle \mathcal {K}u(X), \mathcal{O}_X, \mathcal{O}_X(1), \mathcal{O}_X(2) \right \rangle . \]

The category $\mathcal {K}u(X)$ was introduced by Kuznetsov [Reference KuznetsovKuz10] who proved that it is an example of a CY2 category. For very general cubic fourfolds $\mathcal {K}u(X)$ is not equivalent to the derived category of a (twisted) K3 or abelian surface, so this is a genuinely new example of a CY2 category. The category $\mathcal {K}u(X)$ has close connections to birational geometry, Hodge theory, and hyperkähler varieties, and has been the subject of many recent works [Reference Addington and ThomasAT14, Reference HuybrechtsHuy17, Reference Huybrechts and RennemoHR19, Reference Bayer, Lahoz, Macrì and StellariBLMS22, Reference Li, Pertusi and ZhaoLPZ20, Reference Bayer, Lahoz, Macrì, Nuer, Perry and StellariBLM+21].

Let us also explain a relative version of the above construction. Let $f \colon X \to S$ be a family of cubic fourfolds with $\mathcal {O}_{X}(1)$ the corresponding relatively ample line bundle. Then $f^{*} \colon \operatorname {D_{{perf}}}(S) \to \operatorname {D_{{perf}}}(X)$ is fully faithful, and the Kuznetsov component $\mathcal {K}u(X) \subset \operatorname {D_{{perf}}}(X)$ is the $S$-linear category defined by the $S$-linear semiorthogonal decomposition

\[ \operatorname{D_{{perf}}}(X) = \left \langle \mathcal {K}u(X), f^{*}\operatorname{D_{{perf}}}(S), f^{*}\operatorname{D_{{perf}}}(S) \otimes \mathcal{O}_X(1), f^{*} \operatorname{D_{{perf}}}(S) \otimes \mathcal{O}_X(2) \right \rangle. \]

Note that $\mathcal {K}u(X)$ fiberwise recovers the Kuznetsov components of the fibers of $f \colon X \to S$, that is, for any point $s \in S$ we have $\mathcal {K}u(X)_s \simeq \mathcal {K}u(X_s)$.

Example 6.8 (Gushel–Mukai varieties)

Let $X$ be a GM variety as in Definition 5.28. Recall that there is a Kuznetsov component $\mathcal {K}u(X) \subset \operatorname {D_{{perf}}}(X)$ as defined in (5.4). In [Reference Kuznetsov and PerryKuPe18] it is shown that $\mathcal {K}u(X)$ is a CY2 category if $\dim (X)$ is even, and if $\dim (X) = 4$ or $6$ then for very general $X$ the category $\mathcal {K}u(X)$ is not equivalent to any of the CY2 categories discussed in Examples 6.5 and 6.7 above.

Example 6.9 (Debarre–Voisin varieties)

A Debarre–Voisin (DV) variety is a smooth Plücker hyperplane section $X$ of the Grassmannian $\mathrm {Gr}(3,10)$. These varieties were originally studied in [Reference Debarre and VoisinDV10] because of their role in the construction of a certain hyperkähler fourfold. There is a Kuznetsov component $\mathcal {K}u(X) \subset \operatorname {D_{{perf}}}(X)$ defined by a semiorthogonal decomposition

\[ \operatorname{D_{{perf}}}(X) = \left \langle \mathcal {K}u(X), \mathcal{B}_X, \mathcal{B}_X(1), \dots, \mathcal{B}_X(9) \right \rangle. \]

Here, $\mathcal {B}_X \subset \operatorname {D_{{perf}}}(X)$ is the subcategory generated by $12$ exceptional objects

\[ \mathcal{B}_X = \left \langle \Sigma^{\alpha_1, \alpha_2}\mathcal{U}_X^{\scriptscriptstyle\vee} \mid 0 \leq \alpha_1 \leq 4, 0 \leq \alpha_2 \leq 2, \alpha_2 \leq \alpha_1 \right \rangle , \]

where $\mathcal {U}_X$ denotes the pullback to $X$ of the rank $3$ tautological subbundle on $\mathrm {Gr}(3,10)$, $\Sigma ^{\alpha _1, \alpha _2}$ denotes the Schur functor for the Young diagram of type $(\alpha _1, \alpha _2)$, and $\mathcal {B}_X(i)$ denotes the subcategory obtained by tensoring $\mathcal {B}_X$ with the $i$th power of the Plücker line bundle restricted to $X$. By [Reference KuznetsovKuz19, Corollary 4.4], the category $\mathcal {K}u(X)$ has Serre functor $[2]$. Moreover, a direct computation using the HKR isomorphism shows $\operatorname {HH}^{0}(\mathcal {K}u(X)/\mathbf {C}) = \mathbf {C}$, so $\mathcal {K}u(X)$ is a CY2 category. Using arguments as in [Reference Kuznetsov and PerryKuPe18], one can show that for very general $X$, the category $\mathcal {K}u(X)$ is not equivalent to any of the CY2 categories discussed in Examples 6.56.7, or 6.8, so this provides yet another new example of a CY2 category.

Example 6.10 Using the results of [Reference KuznetsovKuz19], it is easy to construct other examples of varieties with CY2 categories as a semiorthogonal component, but a posteriori one can often show that these CY2 categories reduce to one of the above examples. For instance, if $X \subset \mathbf {P}^{3} \times \mathbf {P}^{3} \times \mathbf {P}^{3}$ is a smooth divisor of class $H_1 + H_2 + H_3$, where $H_i$ is the hyperplane class on the $i$th factor, then there is a CY2 category $\mathcal {K}u(X) \subset \operatorname {D_{{perf}}}(X)$ defined by the decomposition

\[ \operatorname{D_{{perf}}}(X) = \left \langle \mathcal {K}u(X), \pi_{12}^{*} \operatorname{D_{{perf}}}(\mathbf{P}^{3} \times \mathbf{P}^{3}), \pi_{12}^{*} \operatorname{D_{{perf}}}(\mathbf{P}^{3} \times \mathbf{P}^{3})(H_3), \pi_{12}^{*} \operatorname{D_{{perf}}}(\mathbf{P}^{3} \times \mathbf{P}^{3})(2H_3) \right \rangle, \]

where $\pi _{12} \colon X \to \mathbf {P}^{3} \times \mathbf {P}^{3}$ is the projection onto the first two factors. However, one can show that $\mathcal {K}u(X) \simeq \operatorname {D_{{perf}}}(T)$, where $T \subset \mathbf {P}^{3} \times \mathbf {P}^{3}$ is a K3 surface (with generic Picard rank $2$) given as a complete intersection of four hyperplanes determined by the defining equation of $X$. The geometry of this example and an associated hyperkähler variety were studied in [Reference Iliev and ManivelIM19].

Example 6.11 Let $X \subset \mathbf {P}(w_0, w_1, \dots, w_n)$ be a hypersurface in a weighted projective space, regarded as a Deligne–Mumford stack. Note that by [Reference Bergh, Lunts and SchnürerBLS16], if $X$ is smooth and we work over a field of characteristic $0$, then the category $\operatorname {D_{{perf}}}(X)$ admits an admissible embedding into the derived category of a smooth proper variety; in particular, so does any semiorthogonal component of $\operatorname {D_{{perf}}}(X)$. Using this observation, one obtains from [Reference KuznetsovKuz19, Corollary 4.2] an infinite list of weighted projective hypersurfaces $X$ such that $\operatorname {D_{{perf}}}(X)$ contains a CY2 category as the orthogonal to a collection of exceptional objects, but it seems that most (and possibly all) of these categories reduce to a known example.

Example 6.12 Other interesting examples where the derived category of a K3 surface appears as a semiorthogonal component can be constructed via the ‘Cayley trick’ from [Reference OrlovOrl06, Proposition 2.10] (see also [Reference Kiem, Kim, Lee and LeeKKLL17]): If $E$ is a vector bundle of rank $r$ on a variety $Y$, $s \in \mathrm {H}^{0}(Y, E)$ is a regular section, $T \subset Y$ is the zero locus of $s$, and $X \subset \mathbf {P}(E^{\scriptscriptstyle \vee })$ is the zero locus of the section of $\mathcal {O}_{\mathbf {P}(E^{\scriptscriptstyle \vee })}(1)$ corresponding to $s$, then there is a semiorthogonal decomposition of $\operatorname {D_{{perf}}}(X)$ consisting of a copy of $\operatorname {D_{{perf}}}(T)$ and $r-1$ copies of $\operatorname {D_{{perf}}}(Y)$.

This construction applies, for instance, to K3 surfaces that admit a Mukai style description as the zero locus of a section of a vector bundle (see [Reference MukaiMuk02]). It gives Example 6.10 as a special case, but also applies to many other K3 surfaces, including some of Picard rank $1$. For a simple example, consider a $(2,2,2)$ complete intersection K3 surface $T \subset \mathbf {P}^{5}$, so that $T$ is the zero locus of a section of $E = \mathcal {O}(2)^{\oplus 3}$. Then $X \subset \mathbf {P}(E^{\scriptscriptstyle \vee }) \cong \mathbf {P}^{5} \times \mathbf {P}^{2}$ described above is a hypersurface of type $(2,1)$, and $\operatorname {D_{{perf}}}(X)$ admits a decomposition consisting of a copy of $\operatorname {D_{{perf}}}(T)$ and $10$ exceptional objects.

The classification of CY2 categories is an important open problem, especially because of their role in constructing hyperkähler varieties [Reference Bayer, Lahoz, Macrì, Nuer, Perry and StellariBLM+21, Reference Perry, Pertusi and ZhaoPPZ19]. However, finding new CY2 categories appears to be a difficult problem. Besides the above examples, there is conjecturally a new CY2 category arising as a semiorthogonal component in the derived category of a so-called Küchle fourfold [Reference KuznetsovKuz16b], and there is recent work that uses Hodge theory to find candidate Fano varieties with CY2 categories as semiorthogonal components [Reference Fatighenti and MongardiFM21]. In general, Markman and Mehrotra proved the existence of a family of categories satisfying conditions (2) and (3) of Definition 6.1 over a Zariski open subset of any moduli space of hyperkähler varieties of K3$^{[n]}$ type [Reference Markman and MehrotraMM15]; we expect that these categories also satisfy condition (1), and thus give an infinite series of CY2 categories.

Remark 6.13 The categories from Examples 6.7, 6.8, and 6.9 are all of K3 type in the sense that their Hochschild homology agrees with that of a K3 surface. In fact, in Examples 6.7 and 6.8 it is known that for special $X$ the category $\mathcal {K}u(X)$ is equivalent to the derived category of a K3 surface, and conjecturally the same holds in Example 6.9. It would be interesting to construct new examples of CY2 categories which are not of K3 type. For instance, we do not know examples of CY2 categories which have the same Hochschild homology as an abelian surface but which are not equivalent to the derived category of such a surface.

To end this section, let us explain how the results of § 5 can be applied in Example 6.10. The reader may apply similar arguments to other varieties admitting semiorthogonal decompositions with simple components, like those in Example 6.12.

Corollary 6.14 Let $X \subset \mathbf {P}^{3} \times \mathbf {P}^{3} \times \mathbf {P}^{3}$ be a smooth $(1,1,1)$ divisor. Then the Voisin group $\mathrm {V}^{4}(X)$ is $6$-torsion.

Proof. By the Lefschetz hyperplane theorem, the group $\mathrm {H}^{*}(X, \mathbf {Z})$ is torsion-free and $\mathrm {H}^{2m}(X, \mathbf {Z})$ is of Tate type for $m > 4$. By Proposition 5.16(2) it thus suffices to prove the integral Hodge conjecture for $\operatorname {D_{{perf}}}(X)$. But as explained in Example 6.10, this category admits a semiorthogonal decomposition consisting of the derived category of a K3 surface and several copies of the category $\operatorname {D_{{perf}}}(\mathbf {P}^{3} \times \mathbf {P}^{3})$, and $\operatorname {D_{{perf}}}(\mathbf {P}^{3} \times \mathbf {P}^{3})$ in turn admits a semiorthogonal decomposition consisting of copies of the derived category of a point. Therefore the result follows from Lemma 5.20 and Corollary 5.17.

Remark 6.15 It would be interesting to determine whether Corollary 6.14 is optimal, that is, whether there exists an $X$ such that $\mathrm {V}^{4}(X)$ has an order $6$ element.

Corollary 6.14 illustrates the principle that the Hodge conjecture and its variants for a given variety can often be reduced to simpler cases via semiorthogonal decompositions. Later in § 8 we will use this method to prove the integral Hodge conjecture in degree $2$ for cubic and GM fourfolds (Corollary 1.2); the key new ingredient needed to handle these examples is the integral Hodge conjecture for their Kuznetsov components (Proposition 8.2).

7. Moduli of objects in CY2 categories

In this section we prove a key result of this paper, Theorem 1.4, which asserts the smoothness of suitable relative moduli spaces of objects in families of CY2 categories.

7.1 Moduli of objects in categories

Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be an $S$-linear admissible subcategory, where $X \to S$ is a smooth proper morphism of complex varieties. Recall from [Reference Bayer, Lahoz, Macrì, Nuer, Perry and StellariBLM+21, § 9] that Lieblich's work [Reference LieblichLie06] implies there is an algebraic stack $\mathcal {M}(\mathcal {C}/S)$ locally of finite presentation over $S$, parameterizing universally gluable, relatively perfect objects in $\mathcal {C}$. Due to our assumption that $X \to S$ is smooth, the word ‘relatively’ can be dropped, that is, this stack can be defined as follows: for $T \to S$ a scheme over $S$, the $T$-points of $\mathcal {M}(\mathcal {C}/S)$ are objects $E \in \mathcal {C}_{T}$ which for all points $t \in T$ satisfy $\operatorname {Ext}^{<0}_{\kappa (t)}(E_t, E_t) = 0$.

Remark 7.1 The stack $\mathcal {M}(\mathcal {C}/S)$ can also be constructed for $\mathcal {C}$ smooth and proper without assuming the existence of an admissible embedding $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$; see [Reference Toën and VaquiéTV07].

Note that any object $E \in \mathcal {C}$ gives rise to a relative class $\varphi _E \in \Gamma (S^{\mathrm {an}}, \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S))$, whose fiber over $s \in S(\mathbf {C})$ is the class of $E_{s}$ in $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}_s)$.

Definition 7.2 For $\varphi \in \Gamma (S^{\mathrm {an}}, \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S))$, we denote by $\mathcal {M}(\mathcal {C}/S, \varphi )$ the subfunctor of $\mathcal {M}(\mathcal {C}/S)$ parameterizing objects with class equal to $\varphi$, and by $s\mathcal {M}(\mathcal {C}/S, \varphi )$ the subfunctor of $\mathcal {M}(\mathcal {C}/S, \varphi )$ parameterizing objects which are simple.

Lemma 7.3 For $\varphi \in \Gamma (S^{\mathrm {an}}, \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S))$, the functors $\mathcal {M}(\mathcal {C}/S, \varphi )$ and $s\mathcal {M}(\mathcal {C}/S, \varphi )$ are algebraic stacks locally of finite presentation over $S$, and the canonical morphisms

\[ s\mathcal {M}(\mathcal{C}/S, \varphi) \to \mathcal {M}(\mathcal{C}/S, \varphi) \to \mathcal {M}(\mathcal{C}/S) \]

are open immersions. Moreover, the stack $s\mathcal {M}(\mathcal {C}/S, \varphi )$ is a $\mathbf {G}_m$-gerbe over an algebraic space $s\mathrm {M}(\mathcal {C}/S,\varphi )$ locally of finite presentation over $S$.

Proof. By [Reference Bayer, Lahoz, Macrì, Nuer, Perry and StellariBLM+21, Lemma 9.8] it is enough to show that $\mathcal {M}(\mathcal {C}/S, \varphi )$ is an open substack of $\mathcal {M}(\mathcal {C}/S)$. This follows from the fact proved in Proposition 5.7 that $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S)$ is a local system on $S^{\mathrm {an}}$.

7.2 Generalized Mukai's theorem

We will prove Theorem 1.4 after two preparatory lemmas. The first will be useful for controlling deformations of simple universally gluable objects in CY2 categories. Recall from § 3.2 the formalism of Chern classes valued in Hochschild homology.

Lemma 7.4 Let $\mathcal {C}$ be a CY2 category over a Noetherian $\mathbf {Q}$-scheme $S$. Let $E \in \mathcal {C}$ be a simple universally gluable object.

  1. (1) The cohomology sheaves $\operatorname {\mathcal {E}\!{\it xt}}^{i}_S(E,E)$ of $\mathcal {H}\!{\it om}_S(E,E)$ are locally free, vanish for $i \notin [0,2]$, and are line bundles for $i = 0$ and $i = 2$.

  2. (2) The formation of the sheaves $\operatorname {\mathcal {E}\!{\it xt}}^{i}_S(E,E)$ commutes with base change, that is, for any morphism $g \colon T \to S$ and $i \in \mathbf {Z}$ there is a canonical isomorphism

    \begin{align*} g^{*}\operatorname{\mathcal{E}\!{\it xt}}^{i}_S(E,E) \cong \operatorname{\mathcal{E}\!{\it xt}}^{i}_T(E_T,E_T). \end{align*}
  3. (3) The Chern character map

    \begin{align*} \operatorname{ch} \colon \operatorname{\mathcal{E}\!{\it xt}}^{2}_S(E, E) \to \operatorname{HH}_{-2}(\mathcal{C}/S) \end{align*}
    is an isomorphism.

Proof. For any morphism $g \colon T \to S$, we have the base-change formula

(7.1)\begin{equation} g^{*} \mathcal{H}\!{\it om}_S(E, E) \simeq \mathcal{H}\!{\it om}_T(E_T, E_T) \end{equation}

for mapping objects (see [Reference PerryPer19, Lemma 2.10]). For a point $i_s \colon \operatorname {Spec}(\kappa (s)) \to S$, this gives, for any $i$ an isomorphism, an isomorphism

(7.2)\begin{equation} \mathrm{H}^{i}(i_s^{*} \mathcal{H}\!{\it om}_S(E,E)) \cong \operatorname{Ext}^{i}_{\kappa(s)}(E_s, E_s). \end{equation}

Since $\mathrm {S}_{\mathcal {C}_s} = [2]$ is a Serre functor for $\mathcal {C}_s$, we have

\[ \operatorname{Ext}^{i}_{\kappa(s)}(E_s, E_s) \cong \operatorname{Ext}^{2-i}_{\kappa(s)}(E_s, E_s)^{\scriptscriptstyle\vee}. \]

We conclude that these groups vanish for $i \notin [0,2]$ because $E$ is universally gluable, and are one-dimensional for $i = 0,2$ because $E$ is simple. In particular, the complex $\mathcal {H}\!{\it om}_S(E,E)$ is concentrated in degrees $[0,2]$, as this is true of $i_s^{*} \mathcal {H}\!{\it om}_S(E,E)$ for every point $s$.

Now we prove (7.4). As the sheaf $\operatorname {\mathcal {E}\!{\it xt}}^{2}_S(E, E)$ is coherent and $\operatorname {HH}_{-2}(\mathcal {C}/S)$ is finite locally free by Theorem 3.5, to prove $\operatorname {ch} \colon \operatorname {\mathcal {E}\!{\it xt}}^{2}_S(E, E) \to \operatorname {HH}_{-2}(\mathcal {C}/S)$ is an isomorphism it suffices to show that for any point $s \in S$ the (underived) base-changed map

\[ \mathrm{H}^{0}(i_s^{*} \operatorname{ch}) \colon \mathrm{H}^{0}(i_s^{*} \operatorname{\mathcal{E}\!{\it xt}}^{2}_S(E, E)) \to \mathrm{H}^{0}(i_s^{*}\operatorname{HH}_{-2}(\mathcal{C}/S)) \]

is an isomorphism. Note that

\[ \mathrm{H}^{0}(i_s^{*}\operatorname{\mathcal{E}\!{\it xt}}^{2}_S(E,E)) \cong \mathrm{H}^{2}(i_s^{*}\mathcal{H}\!{\it om}_S(E,E)) \cong \operatorname{Ext}^{2}_{\kappa(s)}(E_s, E_s), \]

where the first isomorphism holds because, as shown above, $\operatorname {\mathcal {E}\!{\it xt}}^{2}_S(E,E)$ is the top cohomology sheaf of $\mathcal {H}\!{\it om}_S(E,E)$, and the second isomorphism holds by (7.2). On the other hand, by Theorem 3.5 we have

\[ \mathrm{H}^{0}(i_s^{*}\operatorname{HH}_{-2}(\mathcal{C}/S)) \cong i_s^{*}\operatorname{HH}_{-2}(\mathcal{C}/S) \cong \operatorname{HH}_{-2}(\mathcal{C}_s/\kappa(s)). \]

Under these isomorphisms, the map $\mathrm {H}^{0}(i_s^{*} \operatorname {ch})$ in question is identified with the Chern character map

\begin{align*} \operatorname{ch} \colon \operatorname{Ext}^{2}_{\kappa(s)}(E_s, E_s) \to \operatorname{HH}_{-2}(\mathcal{C}_s/\kappa(s)). \end{align*}

Note that the domain and target of this map are one-dimensional $\kappa (s)$-vector spaces; indeed, for the domain this was observed above, and for the target it holds by the definition of a CY2 category (see Remark 6.3). By Lemma 3.7 this map is dual to the map

\[ \operatorname{Ext}_{\kappa(s)}^{-2}(\mathrm{id}_{\mathcal{C}_s}, \mathrm{S}_{\mathcal{C}_s}) \to \operatorname{Ext}_{\kappa(s)}^{-2}(E_s, \mathrm{S}_{\mathcal{C}_s}(E_s)) . \]

Since $\mathrm {S}_{\mathcal {C}_s} = [2]$ this is evidently nonzero, and hence an isomorphism. All together this proves (7.4), and also shows that $\operatorname {\mathcal {E}\!{\it xt}}^{2}_S(E,E)$ is a line bundle, because, as observed in the proof, $\operatorname {HH}_{-2}(\mathcal {C}/S)$ is locally free of rank $1$.

Now we finish the proof of (1). As $E$ is simple, $\operatorname {\mathcal {E}\!{\it xt}}^{0}_S(E,E) \cong \mathcal {O}_S$ is a line bundle, so it remains only to show that $\operatorname {\mathcal {E}\!{\it xt}}^{1}_S(E,E)$ is locally free. Since $S$ is Noetherian and $\operatorname {\mathcal {E}\!{\it xt}}^{1}_S(E,E)$ is coherent, by the local criterion for flatness it suffices to show $\mathrm {H}^{-1}(i_s^{*} \operatorname {\mathcal {E}\!{\it xt}}_S^{1}(E,E)) = 0$ for every point $s \in S$. By (7.2) we have a spectral sequence with $E_2$-page

\[ E_2^{i,j} = \mathrm{H}^{j}(i_s^{*} \operatorname{\mathcal{E}\!{\it xt}}_S^{i}(E,E)) \implies \operatorname{Ext}_{\kappa(s)}^{i+j}(E_s,E_s). \]

By what we have already shown, $E_2^{0,0}$ and $E_2^{2,0}$ are one-dimensional, $E_2^{0,j}$ and $E_2^{2,j}$ vanish for $j \neq 0$, and $\operatorname {Ext}_{\kappa (s)}^{0}(E_s,E_s)$ is one-dimensional, so the desired vanishing $\mathrm {H}^{-1}(i_s^{*} \operatorname {\mathcal {E}\!{\it xt}}_S^{1}(E,E)) = 0$ follows.

Finally, (2) holds by the base-change formula (7.1) and the freeness of the cohomology sheaves $\operatorname {\mathcal {E}\!{\it xt}}^{i}_S(E,E)$ proved in (1).

The following simple flatness result will be used below to reduce Theorem 1.4 to the case where the base $S$ is smooth.

Lemma 7.5 Let $f \colon X \to S$ be a locally finite type morphism of schemes, with $S$ reduced and locally noetherian. Assume that there exists a surjective finite type universally closed morphism $S' \to S$ such that the base change $f' \colon X' = X_{S'} \to S'$ is flat. Then $f \colon X \to S$ is flat.

Proof. By the valuative criterion for flatness [Reference GrothendieckEGA4, 11.8.1], it suffices to show that the base change $X_T \to T$ is flat for any morphism $g \colon T = \operatorname {Spec}(R) \to S$ from the spectrum of a DVR. Let $K$ be the fraction field of $R$. As $S' \to S$ is surjective and finite type, there exist a finitely generated field extension $K'$ of $K$ and a morphism $\operatorname {Spec}(K') \to S'$ whose image in $S$ is the image of $\operatorname {Spec}(K) \to S$. Let $R'$ be a DVR with fraction field $K'$ which dominates $R$, and let $T' = \operatorname {Spec}(R')$. By the valuative criterion for universal closedness [Sta21, Tag 05JY] we can find a commutative diagram

The base change $X_{T'} \to T'$ is flat by the assumption that $f' \colon X' \to S'$ is flat, so since $T' \to T$ is faithfully flat, the base change $X_{T} \to T$ is also flat.

Proof of Theorem 1.4 We will prove that $s\mathrm {M}(\mathcal {C}/S,\varphi )$ is smooth over $S$; this implies the same for $s\mathcal {M}(\mathcal {C}/S, \varphi )$, because it is a $\mathbf {G}_m$-gerbe over $s\mathrm {M}(\mathcal {C}/S,\varphi )$. We prove the result in several steps.

Step 1. Reduction to the case where the base $S$ is smooth. Let $S' \to S$ be a morphism from a complex variety $S'$, let $\mathcal {C}'$ be the base change of $\mathcal {C}$, and let $\varphi '$ be the pullback of the section $\varphi$ to $S'$. Then $s\mathrm {M}(\mathcal {C}'/S',\varphi ') \to S'$ is the base change of $s\mathrm {M}(\mathcal {C}/S,\varphi ) \to S$ along $S' \to S$. Hence the theorem in the case where the base is a point implies smoothness of the fibers of $s\mathrm {M}(\mathcal {C}/S,\varphi ) \to S$. Similarly, taking a resolution of singularities $S' \to S$, by Lemma 7.5 we see that the theorem in the case of a smooth base implies flatness of $s\mathrm {M}(\mathcal {C}/S,\varphi ) \to S$. Together, this shows that $s\mathrm {M}(\mathcal {C}/S,\varphi ) \to S$ is smooth. Thus from now on we may assume the base $S$ to be smooth.

Step 2. Reduction to proving smoothness of the total space $s\mathrm {M}(\mathcal {C}/S,\varphi )$. As observed above, the case where the base is a point implies that the closed fibers of $s\mathrm {M}(\mathcal {C}/S, \varphi ) \to S$ are smooth. It follows that these fibers are also of constant dimension $-\chi ^{\mathrm {top}}(\varphi, \varphi ) + 2$, where $\chi ^{\mathrm {top}}(-,-)$ denotes the Euler pairing from Proposition 5.7(4), because this number computes $\dim \operatorname {Ext}^{1}(E_0, E_0)$ for any object $E_0$ in $s\mathrm {M}(\mathcal {C}_0/\operatorname {Spec}(\mathbf {C}), \varphi _0)$, $0 \in S(\mathbf {C})$, as $\mathcal {C}_0$ is CY2. Therefore, the morphism $s\mathrm {M}(\mathcal {C}/S,\varphi ) \to S$ is smooth, being a locally finite type morphism between smooth spaces whose closed fibers are smooth of constant dimension.

Step 3. Smoothness in terms of deformation functors of objects. Since $s\mathrm {M}(\mathcal {C}/S,\varphi )$ is locally of finite type over $\mathbf {C}$ by Lemma 7.3, it is smooth if it is formally smooth at any $\mathbf {C}$-point. More precisely, let $E_0$ be a $\mathbf {C}$-point of $s\mathrm {M}(\mathcal {C}/S,\varphi )$ lying over a point $0 \in S$. Let $\mathrm {Art}_{\mathbf {C}}$ denote the category of Artinian local $\mathbf {C}$-algebras with residue field $\mathbf {C}$, and consider the deformation functor

\[ F \colon \mathrm{Art}_{\mathbf{C}} \to \mathrm{Sets} \]

of $E_0$, whose value on $A \in \mathrm {Art}_{\mathbf {C}}$ consists of pairs $(\operatorname {Spec}(A) \to S, E)$ where $\operatorname {Spec}(A) \to S$ takes the closed point $p \in \operatorname {Spec}(A)$ to $0 \in S$, and $E \in s\mathrm {M}(\mathcal {C}/S, \varphi )(A)$ is such that $E_{p} \cong E_0$. For simplicity we often write $E \in F(A)$, suppressing the map $\operatorname {Spec}(A) \to S$ from the notation. Note that in the definition of $F(A)$, the condition $E \in s\mathrm {M}(\mathcal {C}/S, \varphi )(A)$ can be replaced with $E \in \mathcal {C}_A$, since then the condition $E_p \cong E_0 \in s\mathrm {M}(\mathcal {C}/S, \varphi )(\mathbf {C})$ guarantees $E \in s\mathrm {M}(\mathcal {C}/S, \varphi )(A)$. To prove that $s\mathrm {M}(\mathcal {C}/S,\varphi )$ is formally smooth at $E_0$, we must show that $F$ is a smooth functor, that is, for any surjection $A' \to A$ in $\mathrm {Art}_{\mathbf {C}}$ the map $F(A') \to F(A)$ is surjective.

For this purpose, it will also be useful to consider the deformation functor $G \colon \mathrm {Art}_{\mathbf {C}} \to \mathrm {Sets}$ of the point $0 \in S$, whose value on $A \in \mathrm {Art}_{\mathbf {C}}$ consists of morphisms $\operatorname {Spec}(A) \to S$ taking the closed point to $0$. Note that there is a natural morphism of functors $F \to G$.

Step 4. Let $A' \to A$ be a split square-zero extension in $\mathrm {Art}_{\mathbf {C}}$, that is, $A' \cong A[\varepsilon ]/(\varepsilon ^{2})$. Then the fiber $\operatorname {Def}_E(A')$ of the map

\begin{align*} F(A') \to G(A') \times_{G(A)} F(A) \end{align*}

over any point $(\operatorname {Spec}(A') \to S, E)$ is a torsor under $\operatorname {Ext}^{1}_{A}(E, E)$.

By Lemma 4.8, the claim is equivalent to the vanishing of the class $\kappa (\mathcal {C}_{A'})(E) \in \operatorname {Ext}^{2}_A(E, E)$. By Lemma 7.4(3), this is in turn equivalent to the vanishing of $\operatorname {ch}(\kappa (\mathcal {C}_{A'})(E)) \in \operatorname {HH}_{-2}(\mathcal {C}_A/A)$, which by Lemma 4.4 is equal to the product $\kappa (\mathcal {C}_{A'}) \cdot \operatorname {ch}(E)$. Finally, this vanishes because by assumption the class of $E$ remains of Hodge type along $S$.

Step 5. The functor $F$ is smooth. For any integer $n \geq 0$, set

\[ A_n = \mathbf {C}[t]/(t^{n+1})\quad {\rm and}\quad A'_n = A_n[\varepsilon ]/(\varepsilon ^{2}). \]

By the $T^{1}$-lifting theorem [Reference KawamataKaw92, Reference Fantechi and ManettiFM99], the functor $F$ is smooth if for every $n \geq 0$ the natural map

\[ F(A'_{n+1}) \to F(A'_n) \times_{F(A_n)} F(A_{n+1}) \]

is surjective. Note that this map fits into a commutative diagram

where the bottom horizonal arrow is surjective because $0 \in S$ is a smooth point. Therefore, it suffices to prove the map

(7.3)\begin{equation} F(A'_{n+1}) \to G(A'_{n+1}) \times_{G(A'_n) \times_{G(A_n)} G(A_{n+1})} ( F(A'_n) \times_{F(A_n)} F(A_{n+1}) ) \end{equation}

is surjective. Let $(\operatorname {Spec}(A'_{n+1}) \to S, E'_n, E_{n+1})$ be a point of the target of this map, and set $E_n = (E_{n+1})_{A_n} \cong (E'_n)_{A_n}$. By Step 4, the set $\operatorname {Def}_{E_{n+1}}(A'_{n+1})$ of deformations of $E_{n+1}$ over $A'_{n+1}$ is an $\operatorname {Ext}^{1}_{A_{n+1}}(E_{n+1}, E_{n+1})$-torsor, and the set $\operatorname {Def}_{E_{n}}(A'_n)$ of deformations of $E_n$ over $A'_n$ is an $\operatorname {Ext}^{1}_{A_n}(E_n, E_n)$-torsor. The restriction map

(7.4)\begin{equation} \operatorname{Def}_{E_{n+1}}(A'_{n+1}) \to \operatorname{Def}_{E_{n}}(A'_{n}) \end{equation}

is compatible with the torsor structures under the natural map

\[ \operatorname{Ext}^{1}_{{A_{n+1}}}(E_{n+1}, E_{n+1}) \to \operatorname{Ext}^{1}_{{A_n}}(E_n, E_n) . \]

By Lemma 7.4(2) the map on $\operatorname {Ext}^{1}$ groups is identified with the natural surjective map

\[ \operatorname{Ext}^{1}_{{A_{n+1}}}(E_{n+1}, E_{n+1}) \to \operatorname{Ext}^{1}_{{A_{n+1}}}(E_{n+1}, E_{n+1}) \otimes_{A_{n+1}} A_n, \]

so (7.4) is also surjective. Thus there is an element $E'_{n+1} \in \operatorname {Def}_{E_{n+1}}(A'_{n+1})$ which restricts to $E'_n \in \operatorname {Def}_{E_{n}}(A'_{n})$. Equivalently, $E'_{n+1}$ maps to $(\operatorname {Spec}(A'_{n+1}) \to S, E'_n, E_{n+1})$ under (7.3), which proves the required surjectivity. By Step 3, this completes the proof of the theorem.

8. Proofs of results on the integral Hodge conjecture

In this section we prove Theorem 1.1, Corollary 1.2, and Theorem 1.3, as well as several complementary results.

We start with a general criterion for verifying the noncommutative variational integral Hodge conjecture.

Proposition 8.1 Let $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ be an $S$-linear admissible subcategory, where $X \to S$ is a smooth proper morphism of complex varieties. Let $\varphi$ be a section of the local system $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S)$. Assume there exists a complex point $0 \in S(\mathbf {C})$ such that the fiber $\varphi _0 \in \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}_0)$ is the class of an object $E_0 \in \mathcal {C}_0$ with the property that $\mathcal {M}(\mathcal {C}/S, \varphi ) \to S$ is smooth at $E_0$. Then $\varphi _s \in \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}_s)$ is algebraic for every $s \in S(\mathbf {C})$.

Proof. Note that the conclusion of the proposition is insensitive to base change along a surjective morphism $S' \to S$. More precisely, given such an $S' \to S$, choose $0' \in S'(\mathbf {C})$ mapping to $0 \in S(\mathbf {C})$. By base change we obtain an $S'$-linear admissible subcategory $\mathcal {C}' \subset \operatorname {D_{{perf}}}(X')$ where $X' = X \times _{S} S' \to S'$ and a section $\varphi '$ of $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}'/S')$ such that $\varphi '_{0'}$ is the class of the pullback $E_{0'}$ of $E_0$ to $\mathcal {C}_{0'}$, with the property that the morphism $\mathcal {M}(\mathcal {C}'/S', \varphi ') \to S'$ is smooth at $E_{0'}$. Then the conclusion of the proposition for this base-changed family implies the same result for the original family, since it is a fiberwise statement. We freely use this observation below.

Let $\mathcal {M}^{\circ } \subset \mathcal {M}(\mathcal {C}/S, \varphi )$ be the smooth locus of $\mathcal {M}(\mathcal {C}/S, \varphi ) \to S$, that is, the maximal open substack to which the restricted morphism is smooth (see [Sta21, Tag 0DZR]). By assumption $E_0$ lies in the fiber of $\mathcal {M}^{\circ } \to S$ over $0$. The image of $\mathcal {M}^{\circ } \to S$ is thus a nonempty open subset $U \subset S$ containing $0$. Since $\mathcal {M}^{\circ } \to U$ is smooth and surjective, there exists a surjective étale morphism $U' \to U$ with a point $0' \in U'(\mathbf {C})$ mapping to $0 \in U(\mathbf {C})$, such that the base change $\mathcal {M}^{\circ }_{U'} \to U'$ admits a section taking $0'$ to $E_{0'} \in \mathcal {M}^{\circ }_{U'}$. Thus, by base-changing along a compactification $S' \to S$ of the morphism $U' \to S$, we may assume that $\mathcal {M}^{\circ } \to U$ admits a section taking $0$ to $E_0$. In other words, if $\varphi _U$ denotes the section of $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}_U/U)$ given by the restriction of $\varphi$, then there exists an object $E_U \in \mathcal {C}_U$ of class $\varphi _U$ such that $(E_{U})_0 \simeq E_0$.

Next we aim to produce a lift of $E_U \in \mathcal {C}_U$ to an object $E \in \mathcal {C}$. First, we may assume $S$ is smooth by base-changing along a resolution of singularities. Then $X$ is smooth since it is smooth over $S$. It follows that the object $E_U \in \mathcal {C}_U \subset \operatorname {D_{{perf}}}(X_U)$ lifts to an object $F \in \operatorname {D_{{perf}}}(X)$; see, for example, [Reference PolishchukPol07, Lemma 2.3.1]. The projection of $F$ onto $\mathcal {C} \subset \operatorname {D_{{perf}}}(X)$ then gives the desired lift $E \in \mathcal {C}$ of $E_U$. The class $\varphi _E \in \Gamma (S^{\mathrm {an}}, \mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S))$ of $E$ must equal $\varphi$, since these sections of the local system $\mathrm {K}_{0}^{\mathrm {top}}(\mathcal {C}/S)$ agree over the open subset $U$. Therefore, $\varphi _s$ equals the class of $E_s$ for every $s \in S(\mathbf {C})$, and in particular is algebraic.

Proof of Theorem 1.3 By Lemma 5.22 the fibers $\varphi _s \in \widetilde {\mathrm {H}}(\mathcal {C}_s, \mathbf {Z})$ are Hodge classes for all $s \in S(\mathbf {C})$, so by Theorem 1.4 the morphism $s\mathcal {M}(\mathcal {C}/S, \varphi ) \to S$ is smooth. As the morphism $s\mathcal {M}(\mathcal {C}/S, \varphi ) \to \mathcal {M}(\mathcal {C}/S)$ is an open immersion by Lemma 7.3, it follows that the morphism $\mathcal {M}(\mathcal {C}/S, \varphi ) \to S$ is smooth at any point of the domain corresponding to a simple universally gluable object. Thus Proposition 8.1 applies to show $\varphi _s \in \widetilde {\mathrm {H}}(\mathcal {C}_s, \mathbf {Z})$ is algebraic for every $s \in S(\mathbf {C})$.

Proof of Theorem 1.1 We may assume that $v$ is primitive, because if the result is true for $v$ then it is also true for any multiple of $v$. By Theorem 1.3, it thus suffices to show that if $w \in \operatorname {Hdg}(\operatorname {D_{{perf}}}(T, \alpha ), \mathbf {Z})$ is primitive and satisfies $(w,w) \geq -2$ or $(w,w) \geq 0$ according to whether $T$ is K3 or abelian, then it is the class of a simple universally gluable object in $\operatorname {D_{{perf}}}(T, \alpha )$. In fact, more is true: there is a nonempty distinguished component $\operatorname {Stab}^{{\dagger} }(T, \alpha )$ of the space of Bridgeland stability conditions on $\operatorname {D_{{perf}}}(T, \alpha )$, such that, for $\sigma \in \operatorname {Stab}^{{\dagger} }(T, \alpha )$ generic with respect to $w$, the moduli space of $\sigma$-stable objects in $\operatorname {D_{{perf}}}(T, \alpha )$ of class $w$ is nonempty of dimension $(w,w)+2$. For $T$ a K3 surface this is [Reference Bayer and MacrìBM14b, Theorem 6.8] and [Reference Bayer and MacrìBM14a, Theorem 2.15] (based on [Reference YoshiokaYos01, Reference YoshiokaYos06]), and for $T$ an abelian surface and $\alpha = 0$ this is [Reference Bayer and LiBL17, Theorem 2.3] (based on [Reference YoshiokaYos16, Reference Minamide, Yanagida and YoshiokaMYY14]), but the case of general $\alpha$ holds by similar arguments. This completes the proof, because a Bridgeland stable object is necessarily simple and universally gluable.

Our proof of Corollary 1.2 will be based on the following result.

Proposition 8.2 Let $X$ be a cubic or GM fourfold. Then the integral Hodge conjecture holds for $\mathcal {K}u(X)$.

Proof. We verify the criterion of Theorem 1.1. First we claim that the cokernel of the map $\mathrm {K}_0(\mathcal {K}u(X)) \to \operatorname {Hdg}(\mathcal {K}u(X), \mathbf {Z})$ is generated by elements $v \in \operatorname {Hdg}(\mathcal {K}u(X), \mathbf {Z})$ with $(v, v) \geq -2$. Indeed, the image of $\mathrm {K}_0(\mathcal {K}u(X)) \to \operatorname {Hdg}(\mathcal {K}u(X), \mathbf {Z})$ contains a class $\lambda$ with $(\lambda, \lambda ) > 0$; in fact, the image contains, and in the very general case equals, a canonical positive definite rank $2$ sublattice; see [Reference Addington and ThomasAT14, § 2.4] and [Reference Kuznetsov and PerryKuPe18, Lemma 2.27]. The claim then follows because for any $v \in \operatorname {Hdg}(\mathcal {K}u(X), \mathbf {Z})$, we have $(v + t \lambda, v+t\lambda ) \geq -2$ for $t$ a sufficiently large integer.

Therefore, it suffices to show that for any $v \in \operatorname {Hdg}(\mathcal {K}u(X), \mathbf {Z})$, there exists a family of cubic or GM fourfolds $Y \to S$ and points $0,1 \in S(\mathbf {C})$ such that $Y_0 \cong X$, $\mathcal {K}u(Y_1) \simeq \operatorname {D_{{perf}}}(T, \alpha )$ for a twisted K3 surface $(T, \alpha )$, and $v$ remains of Hodge type along $S$.

If $X$ is a cubic fourfold, the existence of such a family of cubic fourfolds $Y \to S$ follows from [Reference Addington and ThomasAT14, Theorem 4.1]. More precisely, the Kuznetsov component of a cubic fourfold containing a plane is equivalent to the derived category of a twisted K3 surface [Reference KuznetsovKuz10], and [Reference Addington and ThomasAT14, Theorem 4.1] uses Laza and Looijenga's description of the image of the period map for cubic fourfolds [Reference LazaLaz10, Reference LooijengaLoo09] to show that $X$ is deformation equivalent within the Hodge locus for $v$ to a cubic fourfold containing a plane.

For GM fourfolds, the argument is more complicated, because less is known about the image of their period map. Recall that a GM fourfold is called special or ordinary according to whether or not, in the notation of Definition 5.28, the vertex of $\operatorname {Cone}(\mathrm {Gr}(2, V_5))$ is contained in the linear subspace $\mathbf {P}^{8} \subset \mathbf {P}^{10}$. By [Reference Kuznetsov and PerryKuPe18, Theorem 1.2], the Kuznetsov component of an ordinary GM fourfold containing a quintic del Pezzo surface is equivalent to the derived category of a K3 surface. Thus it suffices to show that if $X$ is a GM fourfold, it is deformation equivalent within the Hodge locus for $v$ to such a GM fourfold. If the conjectural description of the image of the period map for GM fourfolds were known [Reference Debarre, Iliev and ManivelDIM15, Question 9.1], this could be proved analogously to the case of cubic fourfolds by a lattice-theoretic computation. This conjecture is not known, but we can still use the period map to complete the argument as follows.

By the construction of GM fourfolds in the proof of [Reference Debarre, Iliev and ManivelDIM15, Theorem 8.1], it follows that $X$ is deformation equivalent within the Hodge locus for $v$ to an ordinary GM fourfold $X'$ containing a so-called $\sigma$-plane. We claim that in the fiber through $X'$ of the period map for GM fourfolds, there is an ordinary GM fourfold $X''$ containing a quintic del Pezzo surface. Since preimages of irreducible subvarieties under the period map remain irreducible (see [Reference Perry, Pertusi and ZhaoPPZ19, Lemma 5.12]), the claim implies that $X$ is deformation equivalent within the Hodge locus for $v$ to $X''$.

To prove the claim, we freely use the notation and terminology on Eisenbud–Popescu–Walter (EPW) sextics introduced in [Reference Debarre and KuznetsovDK18, § 3] and summarized in [Reference Kuznetsov and PerryKuPe18, § 3]. Because $X'$ contains a $\sigma$-plane, by [Reference Debarre and KuznetsovDK19, Remark 5.29] the EPW stratum $Y_{A(X')}^{3} \subset \mathbf {P}(V_6(X'))$ is nonempty. Let $\mathbf {p} \in Y_{A(X')^{\perp }}^{1} \subset \mathbf {P}(V_6(X')^{\scriptscriptstyle \vee })$ be a point in the top stratum of the dual EPW sextic, such that the corresponding hyperplane in $\mathbf {P}(V_6(X'))$ does not contain $Y_{A(X')}^{3}$. Let $X''$ be the ordinary GM fourfold corresponding to the pair $(A(X'), \mathbf {p})$; see [Reference Debarre and KuznetsovDK18, Theorem 3.10] or [Reference Kuznetsov and PerryKuPe18, Theorem 3.1]. Then [Reference Debarre and KuznetsovDK19] shows that $X'$ and $X''$ lie in the same fiber of the period map, and [Reference Kuznetsov and PerryKuPe18, Lemma 4.4] shows that $X''$ contains a quintic del Pezzo surface. This finishes the proof of the claim.

Remark 8.3 Proposition 5.8 in [Reference Perry, Pertusi and ZhaoPPZ19] gives the existence of families of GM fourfolds $Y \to S$ satisfying even stronger conditions than those required in the above proof. We preferred to give the above more elementary argument instead, because [Reference Perry, Pertusi and ZhaoPPZ19, Proposition 5.8] relies on deep ingredients: the construction of stability conditions on Kuznetsov components of GM fourfolds, as well as the theory of stability conditions in families from [Reference Bayer, Lahoz, Macrì, Nuer, Perry and StellariBLM+21].

In fact, one of the motivations for this paper was to develop a technique for proving the integral Hodge conjecture for CY2 categories that avoids the difficult problem of constructing stability conditions. As the proof of Proposition 8.2 illustrates, if our categories occur as the Kuznetsov components $\mathcal {K}u(X) \subset \operatorname {D_{{perf}}}(X)$ of members $X$ of a family of varieties, our technique requires three ingredients:

  1. (1) the existence of a class $\lambda$ in the image of the map $\mathrm {K}_0(\mathcal {K}u(X)) \to \operatorname {Hdg}(\mathcal {K}u(X), \mathbf {Z})$ which satisfies $(\lambda, \lambda ) > 0$;

  2. (2) the existence of $X$ such that $\mathcal {K}u(X) \simeq \operatorname {D_{{perf}}}(T, \alpha )$ for a twisted K3 or abelian surface;

  3. (3) sufficient control of Hodge loci to ensure that they always contain $X$ as in (2).

Condition (1) holds in all of the known examples of CY2 categories from § 6.2, and we expect it holds whenever condition (2) does. In practice, checking conditions (2) and (3) requires more work, but there are many available tools; for example, homological projective geometry [Reference KuznetsovKuz07, Reference Jiang, Leung and XieJLX21, Reference Kuznetsov and PerryKuPe21, Reference Kuznetsov and PerryKuPe19] has been crucial in checking condition (2) in the known examples.

Proof of Corollary 1.2 Let $X$ be a cubic or GM fourfold. We claim that $\mathrm {H}^{*}(X, \mathbf {Z})$ is torsion-free and $\mathrm {H}^{2m}(X, \mathbf {Z})$ is of Tate type for $m > 2$. (In fact the Hodge diamond of $X$ can be computed explicitly (see [Reference HassettHas00, Reference Debarre, Iliev and ManivelDIM15]), but the following argument gives a simpler proof of the Tate type statement.) Indeed, for a cubic fourfold the claim holds by the Lefschetz hyperplane theorem. If $X$ is an ordinary GM fourfold, then projection from the vertex of $\operatorname {Cone}(\mathrm {Gr}(2,V_5))$ gives an isomorphism

\[ X \cong \mathrm{Gr}(2, V_5) \cap \mathbf{P}^{8} \cap Q, \]

where $\mathbf {P}^{8} \subset \mathbf {P}^{9}$ is a hyperplane in the Plücker space and $Q \subset \mathbf {P}^{8}$ is a quadric hypersurface. In this case, the Lefschetz hyperplane theorem again gives the claim. This also implies the claim for special GM fourfolds, because they are deformation equivalent to ordinary GM fourfolds.

By Proposition 5.16(2) it thus suffices to prove the integral Hodge conjecture for $\operatorname {D_{{perf}}}(X)$. Recall there is a semiorthogonal decomposition of $\operatorname {D_{{perf}}}(X)$ consisting of $\mathcal {K}u(X)$ and copies of the derived category of a point. Therefore the result follows from Lemma 5.20 and Proposition 8.2.

Similar arguments yield the following corollary.

Corollary 8.4 Let $X$ be a GM sixfold. Then the Voisin group $\mathrm {V}^{3}(X)$ is $2$-torsion.

Proof. By [Reference Debarre and KuznetsovDK16] the group $\mathrm {H}^{*}(X, \mathbf {Z})$ is torsion-free and $\mathrm {H}^{2m}(X, \mathbf {Z})$ is of Tate type for $m > 3$. Thus, as in the proof of Corollary 1.2, by Proposition 5.16(2) we reduce to proving the integral Hodge conjecture for $\mathcal {K}u(X)$. By the duality conjecture for GM varieties [Reference Kuznetsov and PerryKuPe18, Conjecture 3.7] proved in [Reference Kuznetsov and PerryKuPe19, Theorem 1.6] and the description of generalized duals of GM varieties from [Reference Kuznetsov and PerryKuPe18, Lemma 3.8], there exist a GM fourfold $X'$ and an equivalence $\mathcal {K}u(X) \simeq \mathcal {K}u(X')$. Hence the result follows from Proposition 8.2.

Remark 8.5 It would be interesting to determine whether Corollary 8.4 is optimal, that is, whether there exists a GM sixfold $X$ such that $\mathrm {V}^{3}(X) \neq 0$.

Acknowledgements

The genesis of this paper was the Workshop on Derived Categories, Moduli Spaces, and Deformation Theory at Cetraro in June 2019. There, Manfred Lehn asked me whether stability conditions could be removed from the proof of the integral Hodge conjecture for cubic fourfolds in [Reference Bayer, Lahoz, Macrì, Nuer, Perry and StellariBLM+21], and an ensuing discussion with Daniel Huybrechts convinced me that this was possible. I thank both of them for their role in inspiring this paper, as well as the organizers of the conference for creating such a stimulating environment.

I would also like to thank Nicolas Addington, Arend Bayer, Bhargav Bhatt, Olivier Debarre, Sasha Kuznetsov, Jacob Lurie, Emanuele Macrì, Tasos Moulinos, Laura Pertusi, and Xiaolei Zhao for discussions, comments, and questions about this work.

Finally, I thank the referees for their useful comments on the paper.

Footnotes

This work was partially supported by NSF grant DMS-2002709/DMS-2112747 and the Institute for Advanced Study.

1 This is where we use our assumption that everything is defined over a base field; see [Reference Huybrechts and ThomasHT14].

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