1 Introduction
Let
$(V,Q)$
be a quadratic space over
$\mathbb {Q}$
of signature
$(p,q)$
, and let G be its orthogonal group. Let
$\mathbb {D}$
be the space of oriented negative q-planes in
$V(\mathbb {R})$
and
$\mathbb {D}^+$
one of its connected components. It is a Riemannian manifold of dimension
$pq$
and an open subset of the Grassmannian. The Lie group
$G(\mathbb {R})^+$
is the connected component of the identity and acts transitively on
$\mathbb {D}^+$
. Hence, we can identify
$\mathbb {D}^+$
with
$G(\mathbb {R})^+ /K $
, where K is a compact subgroup of
$G(\mathbb {R})^+$
and is isomorphic to
$\operatorname {SO}(p)\times \operatorname {SO}(q)$
. Moreover, let L be a lattice in
$ V(\mathbb {Q}),$
and let
$\Gamma $
be a torsion-free subgroup of
$G(\mathbb {R})^+$
preserving L.
For every vector v in
$V(\mathbb {R})$
such that
$Q(v,v)>0$
, there is a totally geodesic submanifold
$\mathbb {D}^+_v$
of codimension q consisting of all the negative q-planes that are orthogonal to v. Let
$\Gamma _v$
denote the stabilizer of v in
$\Gamma $
. We can view
$ \Gamma _v \backslash \mathbb {D}^+$
as a rank q vector bundle over
$\Gamma _v \backslash \mathbb {D}_v^+$
, so that the natural embedding
$\Gamma _v \backslash \mathbb {D}_v^+ $
in
$ \Gamma _v \backslash \mathbb {D}^+$
is the zero section. In [Reference Kudla and Millson6], Kudla and Millson constructed a closed
$G(\mathbb {R})^+$
-invariant differential form
$$ \begin{align} \varphi_{KM} \in \left [ \Omega^q(\mathbb{D}^+) \otimes \mathscr{S}(V(\mathbb{R})) \right ]^{G(\mathbb{R})^+}, \end{align} $$
where
$G(\mathbb {R})^+$
acts on the Schwartz space
$\mathscr {S}(V(\mathbb {R}))$
from the left by
and on
$\Omega ^q(\mathbb {D}^+) \otimes \mathscr {S}(V(\mathbb {R}))$
from the right by
. In particular,
$\varphi _{KM}(v)$
is a
$\Gamma _v$
-invariant form on
$\mathbb {D}^+$
. The main property of the Kudla–Millson form is its Thom form property: if
$\omega $
in
$\Omega _c^{pq-q}(\Gamma _v \backslash \mathbb {D}^+)$
is a compactly supported form, then
$$ \begin{align} \int_{\Gamma_v \backslash \mathbb{D}^+} \varphi_{KM}(v) \wedge \omega = 2^{-\frac{q}{2}}e^{-\pi Q(v,v)}\int_{\Gamma_v \backslash \mathbb{D}^+_v} \omega. \end{align} $$
Another way to state it is to say that in cohomology, we have
$$ \begin{align} [\varphi_{KM}(v)] = 2^{-\frac{q}{2}}e^{-\pi Q(v,v)} \operatorname{PD}(\Gamma_v \backslash \mathbb{D}^+_v) \in H^q \left (\Gamma_v \backslash \mathbb{D}^+ \right ), \end{align} $$
where
$\operatorname {PD}(\Gamma _v \backslash \mathbb {D}^+_v)$
denotes the Poincaré dual class to
$\Gamma _v \backslash \mathbb {D}^+_v$
.
1.1 Kudla–Millson theta lift
In order to motivate the interest in the Kudla–Millson form, let us briefly recall how it is used to construct a theta correspondence between certain cohomology classes and modular forms. For simplicity,Footnote
1
assume that
$p+q$
is even, and let
$\omega $
be the Weil representation of the dual pair
$\operatorname {SL}_2(\mathbb {R}) \times G(\mathbb {R})$
in
$\mathscr {S}(V(\mathbb {R}))$
. We extend it to a representation in
$\Omega ^q(\mathbb {D}^+) \otimes \mathscr {S}(V(\mathbb {R}))$
by acting in the second factor of the tensor product. Building on the work of [Reference Weil11], Kudla and Millson [Reference Kudla and Millson7, Reference Kudla and Millson9] used their differential form to construct the theta series
where
$\tau =x+iy$
is in
$\mathbb {H}$
and
$g_\tau $
is the matrix
$\begin {pmatrix} \sqrt {y} & x\sqrt {y}^{-1} \\ 0 & \sqrt {y}^{-1} \end {pmatrix}$
in
$\operatorname {SL}_2(\mathbb {R})$
that sends i to
$\tau $
by Möbius transformation. This form is
$\Gamma $
-invariant, closed and holomorphic in cohomology in the sense that
$\frac {\partial }{\partial \overline {\tau }}\Theta _{KM}(\tau )$
is an exact form. Kudla and Millson showed that if we integrate this closed form on a compact q-cycle C in
$\mathcal {Z}_q(\Gamma \backslash \mathbb {D}^+)$
, then
$$ \begin{align} \int_C \Theta_{KM}(\tau)=c_0(C)+\sum_{n=1}^\infty \bigl < C,C_{2n} \bigr>e^{2i\pi n\tau} \end{align} $$
is a modular form of weight
$\frac {p+q}{2}$
, where
and the special cycles
$C_v$
are the images of the composition
$$ \begin{align}\Gamma_v \backslash \mathbb{D}_v^+ \hookrightarrow \Gamma_v \backslash \mathbb{D}^+ \longrightarrow \Gamma \backslash \mathbb{D}^+.\end{align} $$
Thus, the Kudla–Millson theta series realizes a lift between the (co)-homology of
$\Gamma \backslash \mathbb {D}^+$
and the space of weight
$\frac {p+q}{2}$
modular forms.
1.2 The result
Let E be a
$G(\mathbb {R})^+$
-equivariant vector bundle of rank q over
$\mathbb {D}^+$
, and let
$E_0$
be the image of the zero section. By the equivariance, we also have a vector bundle
$\Gamma _v \backslash E$
over
$\Gamma _v \backslash \mathbb {D}^+$
. The Thom class of the vector bundle is a characteristic class
$\operatorname {Th}(\Gamma _v \backslash E)$
in
$ H^{q}(\Gamma _v \backslash E,\Gamma _v \backslash (E-E_0))$
defined by the Thom isomorphism (see Section 3.6). A Thom form is a form representing the Thom class. It can be shown that the Thom class is also the Poincaré dual class to
$\Gamma _v \backslash E_0$
. Let
$s_v \colon \Gamma _v \backslash \mathbb {D}^+ \longrightarrow \Gamma _v \backslash E$
be a section whose zero locus is
$\Gamma _v \backslash \mathbb {D}_v^+$
, then
$$ \begin{align} s_v^\ast \operatorname{Th}(\Gamma_v \backslash E) \in H^q \left (\Gamma_v \backslash \mathbb{D}^+,\Gamma_v \backslash (\mathbb{D}^+-\mathbb{D}_v^+) \right ). \end{align} $$
Viewing it as a class in
$H^q(\Gamma _v \backslash \mathbb {D}^+)$
it is the Poincaré dual class of
$\Gamma _v \backslash \mathbb {D}_v^+$
. Since the Poincaré dual class is unique, property (1.3) implies that
$$ \begin{align} [\varphi_{KM}(v)]= 2^{-\frac{q}{2}}e^{-\pi Q(v,v)} s_v^\ast \operatorname{Th}(\Gamma_v \backslash E) \in H^q \left (\Gamma_v \backslash \mathbb{D}^+\right ), \end{align} $$
on the level of cohomology.
For arbitrary real oriented metric vector bundles, Mathai and Quillen used the Chern–Weil theory to construct in [Reference Mathai and Quillen10] a canonical Thom form on E. We denote by
$U_{MQ}$
the canonical Thom form in
$\Omega ^{q}(E)$
of Mathai and Quillen. Since
$U_{MQ}$
is
$\Gamma $
-invariant, it is also a Thom form for the bundle
$\Gamma _v \backslash E$
for every vector v. The main result is the following.
Theorem (Theorem 4.5)
For a natural choice of a bundle E and of a section
$s_v$
, we have
$\varphi _{KM}(v)= 2^{-\frac {q}{2}}e^{-\pi Q(v,v)} s_v^\ast U_{MQ}$
in
$\Omega ^q(\Gamma _v \backslash \mathbb {D}^+).$
The bundle E is the tautological bundle of the Grassmannian
$\mathbb {D}^+$
(see Section 3.6), and the section
$s_v$
is defined in Section 4.1.
For signature
$(2,q)$
, the spaces are Hermitian and the result was obtained by a similar method in [Reference Garcia3] using the work of Bismut–Gillet–Soulé.
1.3 Generalizations
More generally, for a positive nondegenerate r-subspace
$U \subset V$
spanned by vectors
$v_1, \dots , v_r$
, Kudla and Millson also construct an
$rq$
form
$\varphi _{KM}(v_1,\dots ,v_r)$
. This form can also be recovered by the Mathai–Quillen formalism (see (3) of Section 5). Furthermore, in [Reference Kudla and Millson7, Reference Kudla and Millson9], they not only construct forms for the symmetric space associated with
$\operatorname {SO}(p,q)$
, but also for the Hermitian space associated with
$U(p,q)$
. In this case, one should be able to recover their forms using the formalism of superconnections as in [Reference Mathai and Quillen10, Theorem 8.5]. We expect the computations to be closer to the computations done in [Reference Garcia3].
2 The Kudla–Millson form
2.1 The symmetric space
$\mathbb {D}$
Let
$(V,Q)$
be a rational quadratic space, and let
$(p,q)$
be the signature of
$V(\mathbb {R})$
. Let
$e_1, \dots , e_{p+q}$
be an orthogonal basis of
$V(\mathbb {R})$
such that
$$ \begin{align} Q(e_\alpha , e_\alpha) =1 \quad & \textrm{for} \quad \; 1 \leq \alpha \leq p, \nonumber \\ Q(e_\mu , e_\mu) =-1 \quad & \textrm{for} \quad \; p+1 \leq \mu \leq p+q. \end{align} $$
Note that we will always use letters
$\alpha $
and
$\beta $
for indices between
$1$
and p, and letters
$\mu $
and
$\nu $
for indices between
$p+1$
and
$p+q$
. A plane z in
$V(\mathbb {R})$
is a negative plane if
$Q\big|{}_{z} $
is negative definite. Let
be the set of negative-oriented q-planes in
$V(\mathbb {R})$
. For each negative plane, there are two possible orientations, yielding two connected components
$\mathbb {D}^+ $
and
$ \mathbb {D}^-$
of
$\mathbb {D}$
. Let
$z_0$
in
$\mathbb {D}^+$
be the negative plane spanned by the vectors
$e_{p+1}, \dots , e_{p+q}$
together with a fixed orientation. The group
$G(\mathbb {R})^+$
acts transitively on
$\mathbb {D}^+$
by sending
$z_0$
to
$gz_0$
. Let K be the stabilizer of
$z_0$
, which is isomorphic to
$\operatorname {SO}(p)\times \operatorname {SO}(q)$
. Thus, we have an identification
$$ \begin{align} G(\mathbb{R})^+/K & \longrightarrow \mathbb{D}^+ \nonumber \\ gK & \longmapsto gz_0. \end{align} $$
For z in
$\mathbb {D}^+$
, we denote by
$g_z$
any element of
$G(\mathbb {R})^+$
sending
$z_0$
to z.
For a positive vector v in
$V(\mathbb {R}),$
we define
It is a totally geodesic submanifold of
$\mathbb {D}$
of codimension q. Let
$\mathbb {D}_v^+$
be the intersection of
$\mathbb {D}_v$
with
$\mathbb {D}^+$
.
Let z in
$\mathbb {D}^+$
be a negative plane. With respect to the orthogonal splitting of
$V(\mathbb {R})$
as
$z^\perp \oplus z$
, the quadratic form splits as
$$ \begin{align} Q(v,v)={Q\big|{}_{z^\perp} }(v,v)+{Q\big|{}_{z} }(v,v). \end{align} $$
We define the Siegel majorant at z to be the positive-definite quadratic form
2.2 The Lie algebras
$\mathfrak {g}$
and
$\mathfrak {k}$
Let
be the Lie algebras of
$G(\mathbb {R})^+$
and
$K,$
where
$\mathfrak {so}(z_0)$
is equal to
$\mathfrak {so}(q)$
. The latter is the space of skew-symmetric q by q matrices. Similarly, we have
$\mathfrak {so}(z_0^\perp )$
equals
$\mathfrak {so}(p)$
. Hence, we have a decomposition of
$\mathfrak {k}$
as
$\mathfrak {so}(z_0^\perp ) \oplus \mathfrak {so}(z_0)$
that is orthogonal with respect to the Killing form. Let
$\epsilon $
be the Lie algebra involution of
$\mathfrak {g}$
mapping X to
$-X$
. The
$+1$
-eigenspace of
$\epsilon $
is
$\mathfrak {k}$
and the
$-1$
-eigenspace is
We have a decomposition of
$\mathfrak {g} $
as
$\mathfrak {k} \oplus \mathfrak {p}$
and it is orthogonal with respect to the Killing form. We can identify
$\mathfrak {p}$
with
$\mathfrak {g}/\mathfrak {k}$
. Since
$\epsilon $
is a Lie algebra automorphism, we have that
$$ \begin{align} [\mathfrak{p},\mathfrak{p}] \subset \mathfrak{k}, \qquad \qquad [\mathfrak{k},\mathfrak{p} ] \subset \mathfrak{p}. \end{align} $$
We identify the tangent space of
$\mathbb {D}^+$
at
$eK$
with
$\mathfrak {p}$
and the tangent bundle
$T\mathbb {D}^+$
with
$G(\mathbb {R})^+ \times _K \mathfrak {p}$
, where K acts on
$\mathfrak {p}$
by the
$\operatorname {Ad}$
-representation. We have an isomorphism
A basis of
$\mathfrak {g}$
is given by the set of matrices
and we denote by
$\omega _{ij}$
, its dual basis in the dual space
$\mathfrak {g}^\ast $
. Let
$E_{ij}$
be the elementary matrix sending
$e_i$
to
$e_j$
and the other
$e_k$
’s to
$0$
. Then
$\mathfrak {p}$
is spanned by the matrices
$$ \begin{align}X_{\alpha \mu} = E_{\alpha \mu}+E_{\mu \alpha,}\end{align} $$
and
$\mathfrak {k}$
is spanned by the matrices
$$ \begin{align} X_{\alpha \beta} & = E_{\alpha \beta}-E_{\beta \alpha}, \nonumber \\ X_{\nu \mu} & = -E_{\nu \mu}+E_{\mu \nu}. \end{align} $$
2.3 Poincaré duals
Let M be an arbitrary m-dimensional real orientable manifold without boundary. The integration map yields a nondegenerate pairing [Reference Bott and Tu2, Theorem 5.11]
$$ \begin{align} H^{q}(M) \otimes_{\mathbb{R}} H_c^{m-q}(M)& \longrightarrow \mathbb{R} \nonumber \\ [\omega]\otimes [\eta] & \longmapsto \int_M \omega \wedge \eta, \end{align} $$
where
$H_c(M)$
denotes the cohomology of compactly supported forms on M. This yields an isomorphism between
$H^{q}(M)$
and the dual
$H_c^{m-q}(M)^\ast =\operatorname {Hom}(H_c^{m-q}(M),\mathbb {R})$
. If C is an immersed submanifold of codimension q in M, then C defines a linear functional on
$H_c^{m-q}(M)$
by
$$ \begin{align} \omega \longmapsto \int_C \omega. \end{align} $$
Since we have an isomorphism between
$H_c^{m-q}(M)^\ast $
and
$H^{q}(M)$
, there is a unique cohomology class
$\operatorname {PD}(C)$
in
$H^q(M)$
representing this functional, i.e.,
$$ \begin{align} \int_M \omega \wedge \operatorname{PD}(C) = \int_C \omega \end{align} $$
for every class
$[\omega ]$
in
$H_c^{m-q}(M)$
. We call
$\operatorname {PD}(C)$
the Poincaré dual class to C, and any differential form representing the cohomology class
$\operatorname {PD}(C)$
a Poincaré dual form to C.
2.4 The Kudla–Millson form
The tangent plane at the identity
$T_{eK} \mathbb {D}^+ $
can be identified with
$\mathfrak {p}$
and the cotangent bundle
$(T\mathbb {D}^+)^\ast $
with
$G(\mathbb {R})^+ \times _K \mathfrak {p}^\ast $
, where K acts on
$\mathfrak {p}^\ast $
by the dual of the
$\operatorname {Ad}$
-representation. The basis
$e_1, \dots , e_{p+q}$
identifies
$V(\mathbb {R})$
with
$\mathbb {R}^{p+q}$
. With respect to this basis, the Siegel majorant at
$z_0$
is given by
Recall that
$G(\mathbb {R})^+$
acts on
$\mathscr {S}(\mathbb {R}^{p+q})$
from the left by
$(g \cdot f)(v)= f(g^{-1}v)$
and on
$\Omega ^q(\mathbb {D}^+) \otimes \mathscr {S}(\mathbb {R}^{p+q})$
from the right by
. We have an isomorphism
$$ \begin{align} \left [ \Omega^q(\mathbb{D}^+) \otimes \mathscr{S}(\mathbb{R}^{p+q}) \right ]^{G(\mathbb{R})^+} & \longrightarrow \left [ \sideset{}{^q}\bigwedge \mathfrak{p}^\ast \otimes \mathscr{S}(\mathbb{R}^{p+q}) \right ]^K \nonumber \\ \varphi & \longrightarrow \varphi_e \end{align} $$
by evaluating
$\varphi $
at the basepoint
$eK$
in
$G(\mathbb {R})^+/K$
, corresponding to the point
$z_0$
in
$\mathbb {D}^+$
. We define the Howe operator
$$ \begin{align}D \colon \sideset{}{^\bullet}\bigwedge \mathfrak{p}^\ast \otimes \mathscr{S}(\mathbb{R}^{p+q}) & \longrightarrow \sideset{}{^{\bullet+q}}\bigwedge \mathfrak{p}^\ast \otimes \mathscr{S}(\mathbb{R}^{p+q}) \end{align} $$
by
where
$A_{\alpha \mu }$
denotes left multiplication by
$\omega _{\alpha \mu }$
. The Kudla–Millson form is defined by applying D to the Gaussian:
Kudla and Millson showed that this form is K-invariant. Hence, by the isomorphism (2.19), we get a form
$$ \begin{align} \varphi_{KM} \in \left [ \Omega^q(\mathbb{D}^+) \otimes \mathscr{S}(\mathbb{R}^{p+q}) \right ]^{G(\mathbb{R})^+}\!\!. \end{align} $$
In particular, since
$g^\ast \varphi _{KM}(v)=\varphi _{KM}(g^{-1}v)$
for any
$g \in G(\mathbb {R})^+$
, the form is
$\Gamma _v$
-invariant and defines a form on
$\Gamma _v \backslash \mathbb {D}^+$
. It is also closed and Kudla–Millson prove in [Reference Kudla and Millson8, Proposition 5.2] that it satisfies the Thom form property: for every compactly supported form
$\omega $
in
$\Omega ^{pq-q}_c(\Gamma _v \backslash \mathbb {D}^+)$
, we have
$$ \begin{align} \int_{\Gamma_v \backslash \mathbb{D}^+} \omega \wedge \varphi_{KM}(v) = 2^{-\frac{q}{2}}e^{-\pi Q(v,v)}\int_{\Gamma_v \backslash \mathbb{D}^+_v} \omega. \end{align} $$
3 The Mathai–Quillen formalism
We begin by recalling a few facts about principal bundles, connections, and associated vector bundles. For more details, we refer to [Reference Berline, Getzler and Vergne1, Reference Kobayashi and Nomizu5]. The Mathai–Quillen form is defined in Section 3.7 following [Reference Berline, Getzler and Vergne1] (see also [Reference Getzler, Cruzeiro and Zambrini4]).
3.1 K-principal bundles and principal connections
Let K be
$\operatorname {SO}(p)\times \operatorname {SO}(q)$
as before, and let P be a smooth principal K-bundle. Let
$$ \begin{align} R \colon K \times P \longrightarrow P \nonumber \\ (k,p) \longmapsto R_k(p) \end{align} $$
be the smooth right action of K on P and
$$ \begin{align} \pi \colon P \longrightarrow P/K \end{align} $$
the projection map. For a fixed
$p $
in P, consider the map
$$ \begin{align} R_p \colon K & \longrightarrow P \nonumber \nonumber \\ k & \longmapsto R_k(p). \end{align} $$
Let
$V_pP$
be the image of the derivative at the identity
$$ \begin{align} d_e R_p \colon \mathfrak{k} \longrightarrow T_pP, \end{align} $$
which is injective. It coincides with the kernel of the differential
$d_p\pi $
. A vector in
$V_pP$
is called a vertical vector. Using this map, we can view a vector X in
$\mathfrak {k}$
as a vertical vector field on P. The space P can a priori be arbitrary, but in our case, we will consider either:
-
(1) P is
$G(\mathbb {R})^+$
and
$R_k$
the natural right action sending g to
$gk$
. Then
$P/K$
can be identified with
$\mathbb {D}^+$
. -
(2) P is
$G(\mathbb {R})^+ \times z_0$
and the action
$R_k$
maps
$(g,w)$
to
$(gk,k^{-1}w)$
. In this case,
$P/K$
can be identified with
$G(\mathbb {R})^+ \times _K z_0$
. It is the vector bundle associated with the principal bundle
$G(\mathbb {R})^+$
as defined below.
A principal K-connection on P is a
$1$
-form
$\theta _P $
in
$\Omega ^1(P, \mathfrak {k})$
such that:
-
•
$\iota _X \theta _P = X$
for any
$X $
in
$\mathfrak {k}$
, -
•
$R_k^\ast \theta _P=Ad(k^{-1}) \theta _P \quad $
for any k in K,
where
$\iota _X$
is the interior product
and we view X as a vector field on P. Geometrically, these conditions imply that the kernel of
$\theta _P$
defines a horizontal subspace of
$TP$
that we denote by
$HP$
. It is a complement to the vertical subspace, i.e., we get a splitting of
$T_pP$
as
$V_pP \oplus H_pP$
.
Let
$\mathfrak {g}$
be the Lie algebra of
$G(\mathbb {R})^+$
, and let
$\mathcal {P}$
be the orthogonal projection from
$\mathfrak {g}$
on
$\mathfrak {k}$
. After identifying
$\mathfrak {g}^\ast $
with the space
$\Omega ^1(G(\mathbb {R})^+)^{G(\mathbb {R})^+}$
of
$G(\mathbb {R})^+$
-invariant forms, we define a natural
$1$
-form
$$ \begin{align} \sum_{1 \leq i<j \leq p+q} \omega_{ij} \otimes X_{ij} \in \Omega^1(G(\mathbb{R})^+) \otimes \mathfrak{g} \end{align} $$
called the Maurer–Cartan form, where
$X_{ij}$
is the basis of
$\mathfrak {g}$
defined earlier and
$\omega _{ij}$
its dual in
$\mathfrak {g}^\ast $
. After projection onto
$\mathfrak {k}$
, we get a form
where we identify
$\Omega ^1(G(\mathbb {R})^+, \mathfrak {k})$
with
$\Omega ^1(G(\mathbb {R})^+) \otimes \mathfrak {k}$
. A direct computation shows that it is a principal K-connection on P, when P is
$G(\mathbb {R})^+$
.
If P is
$G(\mathbb {R})^+ \times z_0$
, then the projection
$$ \begin{align} \pi \colon G(\mathbb{R})^+ \times z_0 \longrightarrow G(\mathbb{R})^+ \end{align} $$
induces a pullback map
$$ \begin{align} \pi^\ast \colon \Omega^1(G(\mathbb{R})^+) \longrightarrow \Omega^1(G(\mathbb{R})^+ \times z_0). \end{align} $$
The form
is a principal connection on
$G(\mathbb {R})^+ \times z_0$
.
3.2 The associated vector bundles
Since
$z_0$
is preserved by K, we have an orthogonal K-representation
where we will usually simply write
$kw$
instead of
${k\big|{}_{z_0} }w$
. We can consider the associated vector bundle
$P \times _K z_0$
which is the quotient of
$P \times z_0$
by K, where K acts by sending
$(p,w)$
to
$ (R_k(p), \rho (k)^{-1}w)$
. Hence, an element
$[p,w]$
of
$P \times _K z_0$
is an equivalence class where the equivalence relation identifies
$(p,w)$
with
$(R_k(p), \rho (k)^{-1}w)$
. This is a vector bundle over
$P/K$
with projection map sending
$[p,w]$
to
$\pi (p)$
. Let
$\Omega ^i(P/K,P \times _Kz_0)$
be the space of i-forms valued in
$P \times _Kz_0$
, when i is zero it is the space of smooth sections of the associated bundle.
In the two cases of interest to us, we define
Note that in both cases, P admits a left action of
$G(\mathbb {R})^+$
and that the associated vector bundles are
$G(\mathbb {R})^+$
-equivariant. Moreover, it is a Euclidean bundle, equipped with the inner product
on the fiber. Let
$ \Omega ^i(P,z_0)$
be the space of
$z_0$
-valued differential i-forms on P. A differential form
$\alpha $
in
$\Omega ^i(P,z_0)$
is said to be horizontal if
$\iota _X\alpha $
vanishes for all vertical vector fields X. There is a left action of K on a differential form
$\alpha $
in
$\Omega ^i(P,z_0)$
defined by
and
$\alpha $
is K-invariant if it satisfies
$k\cdot \alpha = \alpha $
for any k in
$K,$
i.e., we have
$R_k^\ast \alpha = \rho (k^{-1}) \alpha $
. We write
$\Omega ^i(P, z_0)^K$
for the space of K-invariant
$z_0$
-valued forms on P. Finally, a form that is horizontal and K-invariant is called a basic form and the space of such forms is denoted by
$\Omega ^i(P,z_0)_{\mathrm{bas}}$
.
Let
$X_1, \dots , X_N$
be tangent vectors of
$P/K$
at
$\pi (p),$
and let
$\widetilde {X}_i$
be tangent vectors of P at p that satisfy
$d_p\pi (\widetilde {X}_i)=X_i$
. There is a map
$$ \begin{align} \Omega^i(P,z_0)_{\mathrm{bas}} & \longrightarrow \Omega^i(P/K,P \times_K z_0) \nonumber \\ \alpha & \longmapsto \omega_\alpha \end{align} $$
defined by
$$ \begin{align} {{\omega_\alpha}\big|{}_{\pi(p)} }(X_1 \wedge \cdots \wedge X_N)={{\alpha}\big|{}_{p} }(\widetilde{X}_1 \wedge \cdots \wedge \widetilde{X}_N). \end{align} $$
Proposition 3.1 The map is well-defined and yields an isomorphism between
$\Omega ^i(P/K,P \times _K z_0)$
and
$\Omega ^i(P,z_0)_{\mathrm{bas}}$
. In particular, if
$z_0$
is one-dimensional, then
$\Omega ^i(P/K)$
is isomorphic to
$\Omega ^i(P)_{\mathrm{bas}}$
.
Proof In the case where i is zero, the horizontally condition is vacuous and the isomorphism simply identifies
$\Omega ^0(P/K,P \times _K z_0)$
with
$\Omega ^0(P,z_0)^K$
. We have a map
which is well defined since
$$ \begin{align} f(R_k(p))=\rho(k)^{-1}f(p). \end{align} $$
Conversely, every smooth section s in
$\Omega ^0(P/K,P \times _K z_0)$
is given by
$$ \begin{align} s(\pi(p))=[p,f_s(p)] \end{align} $$
for some smooth function
$f_s$
in
$\Omega ^0(P,z_0)^K$
. The map sending s to
$f_s$
is inverse to the previous one. The proof is similar for positive i.
3.3 Covariant derivatives
A covariant derivative on the vector bundle
$P \times _K z_0$
is a differential operator
$$ \begin{align} \nabla_P \colon \Omega^0(P/K,P \times_K z_0) & \longrightarrow \Omega^1(P/K,P \times_K z_0), \end{align} $$
such that for every smooth function f in
$C^\infty (P/K),$
we have
$$ \begin{align} \nabla_P(fs)=df\otimes s + f \nabla_P(s). \end{align} $$
The inner product on
$P \times _Kz_0$
defines a pairing
$$ \begin{align} \Omega^i(P/K,P \times_K z_0) \times \Omega^j(P/K,P \times_K z_0) & \longrightarrow \Omega^{i+j}(P/K) \nonumber \\ ( \omega_1 \otimes s_1 , \omega_2 \otimes s_2 ) & \longmapsto \langle \omega_1 \otimes s_1 , \omega_2 \otimes s_2 \rangle = \omega_1 \wedge \omega_2 \langle s_1,s_2 \rangle, \end{align} $$
and we say that the derivative is compatible with the metric if
$$ \begin{align} d\langle s_1,s_2 \rangle = \langle \nabla_Ps_1,s_2 \rangle +\langle s_1,\nabla_Ps_2 \rangle \end{align} $$
for any two sections
$s_1$
and
$s_2$
in
$\Omega ^0(P/K,P\times _Kz_0)$
. There is a covariant derivative that is induced by a principal connection
$\theta _P$
in
$\Omega ^1(P) \otimes \mathfrak {k}$
as follows. The derivative of the representation gives a map
$$ \begin{align} d\rho \colon \mathfrak{k} \longrightarrow \mathfrak{so}(z_0) \subset \operatorname{End}(z_0), \end{align} $$
which we also denote by
$\rho $
by abuse of notation. Note that for the representation (3.11), this is simply the map
$$ \begin{align} \rho \colon \mathfrak{k} & \longrightarrow \mathfrak{so}(z_0) \nonumber \\ X & \longmapsto {{X}\big|{}_{z_0} }, \end{align} $$
since
$\mathfrak {k}$
splits as
$\mathfrak {so}(z_0^\perp ) \oplus \mathfrak {so}(z_0)$
. Composing the principal connection with
$\rho $
defines an element
$$ \begin{align} \rho(\theta_P) \in \Omega^1(P,\mathfrak{so}(z_0)). \end{align} $$
In particular, if s is a section of
$P \times _K z_0$
, then we can identify it with a K-invariant smooth map
$f_s$
in
$\Omega ^0(P, z_0)^K$
. Since
$\rho (\theta _P)$
is a
$\mathfrak {so}(z_0)$
-valued form and
$\mathfrak {so}(z_0)$
is a subspace of
$\operatorname {End}(z_0),$
we can define
$$ \begin{align} df_s+\rho(\theta_P) \cdot f_s \in \Omega^1(P, z_0). \end{align} $$
Lemma 3.2 The form
$df_s+\rho (\theta _P) \cdot f_s$
is basic, hence gives a
$P \times _K z_0$
-valued form on
$P/K$
. Thus,
$d+\rho (\theta _P)$
defines a covariant derivative on
$P \times _K z_0$
. Moreover, it is compatible with the metric.
Proof See [Reference Berline, Getzler and Vergne1, p. 24]. For the compatibility with the metric, it follows from the fact that the connection
$\rho (\theta _P)$
is valued in
$\mathfrak {so}(z_0)$
that
$$ \begin{align}\langle \rho(\theta_P) f_{s_1},f_{s_2} \rangle + \langle f_{s_1}, \rho(\theta_P)f_{s_2} \rangle =0. \end{align} $$
Hence, if we denote by
$\nabla _P$
is the covariant derivative defined by
$d+\rho (\theta _P),$
then
$$ \begin{align}\langle \nabla_Ps_1,s_2 \rangle +\langle s_1,\nabla_Ps_2 \rangle = \langle df_{s_1},f_{s_2} \rangle + \langle f_{s_1}, df_{s_2} \rangle =d \langle f_{s_1},f_{s_2}\rangle=d\langle s_1,s_2 \rangle. \end{align} $$
Let us denote by
$\nabla _P$
the covariant derivative
$d+\rho (\theta _P)$
. It can be extended to a map
$$ \begin{align} \nabla_P \colon \Omega^i(P/K,P \times_K z_0) & \longrightarrow \Omega^{i+1}(P/K,P \times_K z_0) \end{align} $$
by setting
where
$$ \begin{align} \omega \otimes s \in \Omega^i(P/K) \otimes \Omega^0(P/K,P \times_K z_0) \simeq \Omega^i(P/K,P \times_K z_0). \end{align} $$
We define the curvature
$R_P$
in
$\Omega ^2(P,\mathfrak {k})$
by
for two vector fields X and Y on P. It is basic by [Reference Berline, Getzler and Vergne1, Proposition 1.13] and composing with
$\rho $
gives an element
$$ \begin{align} \rho(R_P)\in \Omega^2(P,\mathfrak{so}(z_0))_{\mathrm{bas}}, \end{align} $$
so that we can view it as an element in
$\Omega ^2(P/K,P \times _K \mathfrak {so}(z_0)),$
where K acts on
$\mathfrak {so}(z_0)$
by the
$\operatorname {Ad}$
-representation. For a section s in
$\Omega ^0(P/K,P \times _K z_0)$
, we have [Reference Berline, Getzler and Vergne1, Proposition 1.15]
$$ \begin{align} \nabla_P^2s=\rho(R_p)s\in \Omega^2(P/K,P\times_K z_0). \end{align} $$
From now on, we denote by
$\nabla $
and
$\widetilde {\nabla }$
the covariant derivatives on E and
$\widetilde {E}$
associated with
$\theta $
and
$\widetilde {\theta }$
defined in (3.7) and (3.10). Let R and
$\widetilde {R}$
be their respective curvatures.
3.4 Pullback of bundles
The pullback of E by the projection map gives a canonical bundle
over E. We have the following diagram:
The projection induces a pullback of the sections
$$ \begin{align} \pi^\ast \colon \Omega^i(\mathbb{D},E) \longrightarrow \Omega^i(E,\widetilde{E}). \end{align} $$
We can also pullback the covariant derivative
$\nabla $
to a covariant derivative
$$ \begin{align} \pi^\ast \nabla \colon \Omega^0(E,\pi^\ast E) \longrightarrow \Omega^1(E,\pi^\ast E) \end{align} $$
on
$\pi ^\ast E$
. It is characterized by the property
$$ \begin{align} (\pi^\ast \nabla)(\pi^\ast s)=\pi^\ast (\nabla s). \end{align} $$
Proposition 3.3 The bundles
$\widetilde {E}$
and
$\pi ^\ast E$
are isomorphic, and this isomorphism identifies
$\widetilde {\nabla }$
and
$\pi ^\ast \nabla $
.
Proof By definition,
$([g_1,w_1],[g_2,w_2])$
are elements of
$ \pi ^\ast E$
if and only if
$g^{-1}_1g_2$
is in K. We have a
$G(\mathbb {R})^+$
-equivariant morphism
$$ \begin{align} \pi^\ast E & \longrightarrow \widetilde{E} \nonumber \\ ([g_1,w_1],[g_2,w_2]) & \longrightarrow [(g_1,g_1^{-1}g_2w_2),w_1]. \end{align} $$
This map is well defined and has as inverse
$$ \begin{align} \widetilde{E} & \longrightarrow \pi^\ast E \nonumber \\ [(g,w_1),w_2] & \longrightarrow ([g,w_2],[g,w_1]). \end{align} $$
The second statement follows from the fact that
$\widetilde {\theta }$
is
$\pi ^\ast \theta $
.
3.5 A few operations on the vector bundles
We extend the K-representation
$z_0$
to
$\bigwedge ^j z_0$
by
$$ \begin{align} k(w_1 \wedge \cdots \wedge w_j)=(kw_1) \wedge \cdots \wedge (k w_j). \end{align} $$
We consider the bundles
$P \times _K \wedge ^j z_0$
and
$ P \times _K \wedge z_0$
over
$P/K$
, where
$\bigwedge z_0$
is defined as
$ \bigoplus _i \bigwedge ^iz_0$
. Denote the space of differential forms valued in
$P \times _K \wedge ^j z_0$
by
The total space of differential forms
$$ \begin{align} \Omega(P/K,P\times_K \wedge z_0) = \bigoplus_{i,j} \Omega_P^{i,j} \end{align} $$
is an (associative) bigraded
$C^\infty (P/K)$
-algebra, where the product is defined by
This algebra structure allows us to define an exponential map by
where
$\omega ^k$
is the k-fold wedge product
$\omega \wedge \cdots \wedge \omega $
.
Remark 3.1 Suppose that
$\omega $
and
$\eta $
commute. Then the binomial formula
$$ \begin{align} (\omega+\eta)^k=\sum_{l=0}^k \binom{k}{l}\omega^l\eta^{k-l} \end{align} $$
holds and one can show that
$\exp (\omega +\eta )=\exp (\omega )+\exp (\eta )$
in the same way as for the real exponential map. In particular, the diagonal subalgebra
$\bigoplus \Omega _P^{i,i}$
is a commutative, since for two forms
$\omega $
and
$\eta $
in
$\Omega _P$
, we have
$$ \begin{align} \omega \wedge \eta =(-1)^{\deg(\omega)+\deg(\eta)} \eta \wedge \omega \end{align} $$
and similarly for two sections s and t in
$\Omega ^0(P/K,P \times _K z_0)$
.
The inner product
$\langle - , - \rangle $
on
$z_0$
can be extended to an inner product on
$\bigwedge z_0$
by
If
$e_1, \dots , e_q$
is an orthonormal basis of
$z_0$
, then the set
$$ \begin{align} \{ e_{i_1} \wedge \cdots \wedge e_{i_k} \; \vert \; 1 \leq k \leq q, \; i_1 < i_2< \cdots <i_k \}\end{align} $$
is an orthonormal basis of
$\bigwedge z_0$
. We define the Berezin integral
$\int ^B$
to be the orthogonal projection onto the top dimensional component, that is the map
$$ \begin{align} \int^B \colon \bigwedge z_0& \longrightarrow \mathbb{R} \nonumber \\ w & \longmapsto \langle w \; , \;e_1\wedge \cdots \wedge e_q \rangle. \end{align} $$
The Berezin integral can then be extended to
$$ \begin{align} \int^B \colon \Omega(P/K,P\times_K \wedge z_0) & \longrightarrow \Omega(P/K) \nonumber \\ \omega \otimes s & \longmapsto \omega \int^B s, \end{align} $$
where
$\int ^B s$
in
$C^\infty (P/K)$
is the composition of the section with the Berezinian in every fiber. Let
$s_1, \dots , s_q$
be a local orthonormal frame of
$P \times _K z_0$
. Then
$s_1 \wedge \cdots \wedge s_q$
is in
$\Omega ^0(P/K,\wedge ^q P \times _K z_0)$
and defines a global section. Hence, for
$\alpha $
in
$\Omega (P/K,P\times _K \wedge z_0),$
we have
$$ \begin{align} \int^B\alpha=\langle \alpha, s_1 \wedge \cdots \wedge s_q \rangle. \end{align} $$
Finally, for every section s in
$\Omega ^{0,1}$
, we can define the contraction
$$ \begin{align} i(s) \colon \Omega_P^{i,j} & \longrightarrow \Omega_P^{i,j-1} \nonumber \\ \omega \otimes s_1 \wedge \cdots \wedge s_j & \longmapsto \sum_{k=1}^j (-1)^{i+k-1}\langle s,s_k \rangle \omega \otimes s_1\wedge \cdots \wedge \widehat{s_k} \wedge \cdots \wedge s_j, \end{align} $$
and extended by linearity, where the symbol
$ \, \widehat {\cdot } \,$
means that we remove it from the product. Note that when j is zero, then
$i(s)$
is defined to be zero. The contraction
$i(s)$
defines a derivation on
$\oplus \widetilde {\Omega }^{i,j}$
that satisfies
$$ \begin{align} i(s)(\alpha \wedge \alpha')=(i(s) \alpha) \wedge \alpha'+(-1)^{i+j}\alpha \wedge (i(s)\alpha') \end{align} $$
for
$\alpha $
in
$\widetilde {\Omega }^{i,j}$
and
$\alpha '$
in
$\widetilde {\Omega }^{k,l}$
.
3.6 Thom forms
We denote by E the bundle
$G(\mathbb {R})^+\times _K z_0$
. On the fibers of the bundle, we have the inner product given by
. Let v be arbitrary vector in L and
$\Gamma _v$
its stabilizer. Since the bundle is
$G(\mathbb {R})^+$
-equivariant, we have a bundle
$$ \begin{align} \Gamma_v \backslash E \longrightarrow \Gamma_v \backslash \mathbb{D}^+, \end{align} $$
and let
$\operatorname {D}(\Gamma _v \backslash E)$
be the closed disk bundle. If we have a closed
$(q+i)$
-form on
$\Gamma _v \backslash E$
whose support is contained in
$\operatorname {D}(\Gamma _v \backslash E)$
, then it has compact support in the fiber and represents a class in
$H^{q+i}(\Gamma _v \backslash E,\Gamma _v \backslash E-\operatorname {D}(\Gamma _v \backslash E))$
. The cohomology group
$H^{\bullet }(\Gamma _v \backslash E,\Gamma _v \backslash E-\operatorname {D}(\Gamma _v \backslash E))$
is equal to the cohomology group
$H^{\bullet }(\Gamma _v \backslash E,\Gamma _v \backslash (E-E_0))$
that we used in the introduction, where
$E_0$
is the zero section. Fiber integration induces an isomorphism on the level of cohomology
$$ \begin{align} \operatorname{Th} \colon H^{q+i}(\Gamma_v \backslash E,\Gamma_v \backslash E-\operatorname{D}(\Gamma_v \backslash E)) & \longrightarrow H^i(\Gamma_v \backslash \mathbb{D}^+) \nonumber \\ [\omega] & \longmapsto \int_{\mathrm{fiber}} \omega \end{align} $$
known as the Thom isomorphism [Reference Bott and Tu2, Theorem 6.17]. When i is zero, then
$H^i(\Gamma _v \backslash \mathbb {D}^+)$
is
$\mathbb {R}$
and we call the preimage of
$1$
the Thom class. Any differential form representating this class is called a Thom form, in particular, every closed q-form on
$\Gamma _v \backslash E$
that has compact support in every fiber and whose integral along every fiber is
$1$
is a Thom form. One can also view the Thom class as the Poincaré dual class of the zero section
$E_0$
in E, in the same sense as for (2.24).
Let
$\omega $
in
$\Omega ^j(E)$
be a form on the bundle, and let
$\omega _z$
be its restriction to a fiber
$E_z=\pi ^{-1}(z)$
for some z in
$\mathbb {D}^+$
. After identifying
$z_0$
with
$\mathbb {R}^q$
, we see
$\omega _z$
as an element of
$C^\infty (\mathbb {R}^q) \otimes \wedge ^j(\mathbb {R}^q)^\ast $
. We say that
$\omega $
is rapidly decreasing in the fiber, if
$\omega _z$
lies in
$\mathscr {S}(\mathbb {R}^q) \otimes \wedge ^j(\mathbb {R}^q)^\ast $
for every z in
$\mathbb {D}^+$
. We write
$\Omega ^j_{\textrm {rd}}(E)$
for the space of such forms.
Let
$\Omega ^\bullet _{\textrm {rd}}(\Gamma _v \backslash E)$
be the complex of rapidly decreasing forms in the fiber. It is isomorphic to the complex
$\Omega ^\bullet _{\textrm {rd}}(E)^{\Gamma _v}$
of rapidly decreasing
$\Gamma _v$
-invariant forms on E. Let
$H_{\textrm {rd}}(\Gamma _v \backslash E)$
the cohomology of this complex. The map
$$ \begin{align} h \colon \Gamma_v \backslash E & \longrightarrow \Gamma_v \backslash E \nonumber \\ w & \longrightarrow \frac{w}{\sqrt{1-\lVert {w} \rVert^2}} \end{align} $$
is a diffeomorphism from the open disk bundle
$\operatorname {D}(\Gamma _v \backslash E)^\circ $
onto
$\Gamma _v \backslash E$
. It induces an isomorphism by pullback
$$ \begin{align} h^\ast \colon H_{\textrm{rd}}(\Gamma_v \backslash E) \longrightarrow H(\Gamma_v \backslash E,\Gamma_v \backslash E-\operatorname{D}(\Gamma_v \backslash E)), \end{align} $$
which commutes with the fiber integration. Hence, we have the following version of the Thom isomorphism:
$$ \begin{align} H_{\textrm{rd}}^{q+i}(\Gamma_v \backslash E) & \longrightarrow H^i(\Gamma_v \backslash \mathbb{D}^+). \end{align} $$
The construction of Mathai and Quillen produces a Thom form
$$ \begin{align} U_{MQ} \in \Omega_{\textrm{rd}}^q(E), \end{align} $$
which is
$G(\mathbb {R})^+$
-invariant (hence,
$\Gamma _v$
-invariant) and closed. We will recall their construction in the next section.
3.7 The Mathai–Quillen construction
As earlier, let
$\widetilde {E}$
be the bundle
$(G(\mathbb {R})^+ \times z_0) \times _K z_0$
. Let
$ \wedge ^j \tilde {E} $
be the bundle
$(G(\mathbb {R})^+ \times z_0) \times _K \wedge ^j z_0$
and
First, consider the tautological section
$\mathbf{s}$
of
$\widetilde {E}$
defined by
This gives a canonical element
$\mathbf{s}$
of
$\widetilde {\Omega }^{0,1}$
. Composing with the norm induced from the inner product, we get an element
$\lVert \mathbf{s} \rVert ^2$
in
$\widetilde {\Omega }^{0,0}$
.
The representation
$\rho $
on
$z_0$
induces a representation on
$\wedge ^iz_0$
that we also denote by
$\rho $
. The derivative at the identity gives a map
$$ \begin{align} \rho \colon \mathfrak{k} \longrightarrow \mathfrak{so}(\wedge^i z_0). \end{align} $$
The connection form
$\rho (\widetilde {\theta })$
in
$\Omega ^1(G(\mathbb {R})^+ \times z_0,\wedge ^j z_0)$
defines a covariant derivative
$$ \begin{align} \widetilde{\nabla} \colon \widetilde{\Omega}^{0,j} \longrightarrow \widetilde{\Omega}^{1,j} \end{align} $$
on
$\wedge ^j \widetilde {E}$
. We can extend it to a map
$$ \begin{align} \widetilde{\nabla} \colon \widetilde{\Omega}^{i,j} \longrightarrow \widetilde{\Omega}^{i+1,j} \end{align} $$
by setting
as in (3.30). The connection on
$\widetilde {\Omega }^{i,j}$
is compatible with the metric. Finally, the covariant derivative
$\widetilde {\nabla }$
defines a derivation on
$\oplus \widetilde {\Omega }^{i,j}$
that satisfies
$$ \begin{align} \widetilde{\nabla}(\alpha \wedge \alpha')=(\widetilde{\nabla} \alpha) \wedge \alpha'+(-1)^{i+j}\alpha \wedge (\widetilde{\nabla}\alpha') \end{align} $$
for any
$\alpha $
in
$\widetilde {\Omega }^{i,j}$
and
$\alpha '$
in
$\widetilde {\Omega }^{k,l}$
.
Taking the derivative of the tautological section gives an element
$$ \begin{align} \widetilde{\nabla}\mathbf{s}=d\mathbf{s }+\rho(\widetilde{\theta}) \mathbf{s} \in \widetilde{\Omega}^{1,1}. \end{align} $$
Let
$\mathfrak {so}(\widetilde {E})$
denote the bundle
$(G(\mathbb {R})^+ \times z_0) \times _K \mathfrak {so}(z_0)$
and consider the curvature
$\rho (\widetilde {R})$
in
$\Omega ^2(\widetilde {E}, \mathfrak {so}(\widetilde {E}))$
. We have an isomorphism
$$ \begin{align} {{T^{-1}}\big|{}_{z_0} } \colon \mathfrak{so}(z_0) & \longrightarrow \wedge^2 z_0 \nonumber \\ A & \longmapsto \sum_{i<j}\langle Ae_i,e_j\rangle e_i \wedge e_j. \end{align} $$
The inverse sends
$v \wedge w$
to the endomorphism
$ u \mapsto \langle v,u \rangle w-\langle w,u \rangle v$
, and is the isomorphism from (2.11) restricted to
$z_0$
. Note that we have
$$ \begin{align} T(v \wedge w) u =\iota(u) v \wedge w. \end{align} $$
Using this isomorphism, we can also identify
$\mathfrak {so}(\widetilde {E})$
and
$\wedge ^2 \widetilde {E}$
so that we can view the curvature as an element
$$ \begin{align} \rho(\widetilde{R}) \in \widetilde{\Omega}^{2,2}. \end{align} $$
Lemma 3.4 The form
lying in
$\widetilde {\Omega }^{0,0} \oplus \widetilde {\Omega }^{1,1} \oplus \widetilde {\Omega }^{2,2}$
is annihilated by
$\widetilde {\nabla }+ 2 \sqrt {\pi } i(\mathbf{s})$
. Moreover
$$ \begin{align}d\int^B \alpha=\int^B \widetilde{\nabla} \alpha,\end{align} $$
for every form
$\alpha $
in
$\widetilde {\Omega }^{i,j}$
. Hence,
$\int ^B exp(-\omega )$
is a closed form.
Proof We have
$$ \begin{align} & \left (\widetilde{\nabla}+ 2 \sqrt{\pi} i(\mathbf{s}) \right ) \left ( 2 \pi \lVert \mathbf{s} \rVert^2+2 \sqrt{\pi}\widetilde{\nabla} \mathbf{s}-\rho(\widetilde{R}) \right ) \\ & = 2 \pi \widetilde{\nabla} \lVert \mathbf{s} \rVert^2 + 4\pi^{\frac{3}{2}}i(\mathbf{s}) \lVert \mathbf{s} \rVert^2 + 2 \sqrt{\pi} \widetilde{\nabla}^2 \mathbf{s}+4 \pi i(x) \widetilde{\nabla} \mathbf{s}-\widetilde{\nabla} \rho(\widetilde{R})-2 \sqrt{\pi} i(\mathbf{s}) \rho(\widetilde{R}). \nonumber \end{align} $$
It vanishes, because we have the following:
-
∙
$i(\mathbf{s}) \lVert \mathbf{s} \rVert ^2=0$
since
$\lVert \mathbf{s} \rVert $
is in
$\widetilde {\Omega }^{0,0}$
, -
∙
$\widetilde {\nabla } \rho (\widetilde {R})=0$
by Bianchi’s identity, -
∙
$\widetilde {\nabla }\lVert \mathbf{s} \rVert ^2= 2\langle \widetilde {\nabla }\mathbf{s},\mathbf{s} \rangle =-2 i(\mathbf{s}) \widetilde {\nabla }\mathbf{s} $
, -
∙
$\widetilde {\nabla }^2\mathbf{s}=\rho (\widetilde {R})\mathbf{s} =i(\mathbf{s})\rho (\widetilde {R})$
.
For the last point, we used (3.73), where we view
$\rho (\widetilde {R})$
as an element of
$\Omega ^2(E,\mathfrak {so}(\widetilde {E}))$
, respectively of
$\Omega ^2(E,\wedge ^2\widetilde {E})$
.
Let
$s_1 \wedge \cdots \wedge s_q$
in
$\Omega ^0(E,\wedge ^q \widetilde {E})$
be a global section, where
$s_1, \dots , s_q$
is a local orthonormal frame for
$\widetilde {E}$
. Then, for any
$\alpha $
in
$\widetilde {\Omega }^{i,j}$
, we have
$$ \begin{align}\int^B\alpha=\langle \alpha, s_1 \wedge \cdots \wedge s_q \rangle. \end{align} $$
This vanishes if j is different from q, hence we can assume
$\alpha $
is in
$\widetilde {\Omega }^{i,q}$
. If we write
$\alpha $
as
$\beta s_1 \wedge \cdots \wedge s_q$
for some
$\beta $
in
$\Omega ^i(E)$
, then
$$ \begin{align}\int^B \alpha = \beta.\end{align} $$
On the other hand, since the connection on
$\widetilde {\Omega }^{i,q}$
is compatible with the metric, we have
$$ \begin{align} 0 = d \langle s_1 \wedge \cdots \wedge s_q,s_1 \wedge \cdots \wedge s_q \rangle = 2 \langle \widetilde{\nabla}(s_1 \wedge \cdots \wedge s_q),s_1 \wedge \cdots \wedge s_q \rangle. \end{align} $$
Then we have
$$ \begin{align} \int^B \widetilde{\nabla} \alpha & =\langle \widetilde{\nabla} \alpha, s_1 \wedge \cdots \wedge s_q \rangle \nonumber \\ & = \langle d\beta \otimes s_1 \wedge \cdots \wedge s_q + (-1)^i \beta \wedge \widetilde{\nabla}( s_1 \wedge \cdots \wedge s_q),s_1 \wedge \cdots \wedge s_q \rangle \nonumber \\ & = d \beta \nonumber \\ & = d \int^B \alpha. \end{align} $$
Since
$\widetilde {\nabla } + 2 \sqrt {\pi }i(\mathbf{s})$
is a derivation that annihilates
$\omega $
, we have
$$ \begin{align} \left (\widetilde{\nabla} + 2 \sqrt{\pi}i(\mathbf{s}) \right ) \omega^k=0\end{align} $$
for positive k. Hence, it follows that
$$ \begin{align} d \int^B \exp(-\omega) & = \int^B \widetilde{\nabla} \exp(-\omega) \nonumber \\ & = \int^B \left (\widetilde{\nabla}+2 \sqrt{\pi}i(\mathbf{s}) \right )\exp(-\omega) \nonumber \\ & =0.\\[-34pt]\nonumber \end{align} $$
In [Reference Mathai and Quillen10], Mathai and Quillen define the following form:
We call it the Mathai–Quillen form.
Proposition 3.5 The Mathai–Quillen form is a Thom form.
Proof From the previous lemma, it follows that the form is closed. It remains to show that its integral along the fibers is
$1$
. The restriction of the form
$U_{MQ}$
along the fiber
$\pi ^{-1}(eK)$
is given by
$$ \begin{align} U_{MQ} & = (- 1)^{\frac{q(q+1)}{2}} (2\pi)^{-\frac{q}{2}} e^{-2 \pi \lVert \mathbf{s} \rVert^2} \int^B \exp(-2 \sqrt{\pi} d \mathbf{s}) \nonumber \\ & = (- 1)^{\frac{q(q+1)}{2}} 2^{\frac{q}{2}} e^{-2 \pi \lVert \mathbf{s} \rVert^2} (-1)^q \int^B (dx_1 \otimes e_1) \wedge \cdots \wedge (dx_q \otimes e_q) \nonumber \\ & = 2^{\frac{q}{2}} e^{-2 \pi \lVert \mathbf{s} \rVert^2} dx_1 \wedge \cdots \wedge dx_q, \end{align} $$
and its integral over the fiber
$\pi ^{-1}(eK)$
is equal to
$1$
.
4 Computation of the Mathai–Quillen form
4.1 The section
$s_v$
Let
$\textrm {pr}$
denote the orthogonal projection of
$V(\mathbb {R})$
on the plane
$z_0$
. Consider the section
$$ \begin{align} s_v \colon \mathbb{D}^+ & \longrightarrow E \nonumber \\ z \; & \longmapsto [g_z,\textrm{pr}(g_z^{-1}v)], \end{align} $$
where
$g_z$
is any element of
$G(\mathbb {R})^+$
sending
$z_0$
to z. Let us denote by
$L_g$
the left action of an element g in
$G(\mathbb {R})^+$
on
$\mathbb {D}^+$
. We also denote by
$L_g$
the action on E given by
$L_{g}[g_z,v]=[gg_z,v]$
. The bundle is
$G(\mathbb {R})^+$
-equivariant with respect to these actions.
Proposition 4.1 The section
$s_v$
is well-defined and
$\Gamma _v$
-equivariant. Moreover, its zero locus is precisely
$\mathbb {D}^+_v$
.
Proof The section is well-defined, since replacing
$g_z$
by
$g_zk$
gives
$$ \begin{align}s_v(z)=[g_zk,\textrm{pr}(k^{-1}g_z^{-1}v)]=[g_zk,k^{-1}\textrm{pr}(g_z^{-1}v)]=[g,\textrm{pr}(g_z^{-1}v)]=s_v(z).\end{align} $$
Suppose that z is in the zero locus of
$s_v$
, that is to say
$\textrm {pr}(g_z^{-1}v)$
vanishes. Then
$g_z^{-1}v$
is in
$z_0^\perp $
. It is equivalent to the fact that
$z=g_zz_0$
is a subspace of
$v^\perp $
, which means that z is in
$\mathbb {D}_v^+$
. Hence, the zero locus of
$s_v$
is exactly
$\mathbb {D}^+_v$
. For the equivariance, note that we have
$$ \begin{align} s_v \circ L_{g}(z)=[gg_z,\operatorname{pr}(g_z^{-1}g^{-1}v)]=L_{g} \circ s_{g^{-1}v}(z). \end{align} $$
Hence, if
$\gamma $
is an element of
$\Gamma _v$
, we have
$$ \begin{align} s_v \circ L_{\gamma}=L_\gamma \circ s_v. \end{align} $$
We define the pullback
of the Mathai–Quillen form by
$s_v$
. It defines a form
$$ \begin{align} \varphi^0 \in C^\infty(\mathbb{R}^{p+q}) \otimes \Omega^q(\mathbb{D})^+. \end{align} $$
It is only rapidly decreasing on
$\mathbb {R}^q$
, and in order to make it rapidly decreasing everywhere we set
It defines a form
$ \varphi \in \mathscr {S}(\mathbb {R}^{p+q}) \otimes \Omega ^q(\mathbb {D})^+$
.
Proposition 4.2
-
(1) For fixed v in
$V(\mathbb {R}),$
the form
$\varphi ^0(v)$
in
$\Omega ^q(\mathbb {D}^+)$
is given by (4.7)
$$ \begin{align} \varphi^0(v) & = (- 1)^{\frac{q(q+1)}{2}} (2\pi)^{-\frac{q}{2}} \exp \left (2 \pi {Q\big|{}_{z_0} }(v,v) \right ) \int^B \exp \left (-2 \sqrt{\pi} \nabla s_v+\rho(R)\right ). \end{align} $$
-
(2) It satisfies
$L_g^\ast \varphi ^0(v)=\varphi ^0(g^{-1}v)$
, hence (4.8)
$$ \begin{align} \varphi^0 \in \left [\Omega^q(\mathbb{D}^+) \otimes C^\infty(\mathbb{R}^{p+q}) \right ]^{G(\mathbb{R})^+}.\end{align} $$
-
(3) It is a Poincaré dual of
$\Gamma _v \backslash \mathbb {D}_v^+$
in
$\Gamma _v \backslash \mathbb {D}^+$
.
Proof
-
(1) Recall that
$\widetilde {\nabla }=\pi ^\ast \nabla $
and
$\widetilde {R}=\pi ^\ast R$
. We pullback by
$s_v$
Since
$\pi \circ s_v$
is the identity, we have (4.9)
$$ \begin{align} s_v^\ast \widetilde{\nabla} = s_v^\ast \pi^\ast \nabla = \nabla. \end{align} $$
Hence, the pullback connection
$s_v^\ast \widetilde {\nabla }$
satisfies (4.10)since
$$ \begin{align} s_v^\ast (\widetilde{\nabla} \mathbf{s})= (s_v^\ast \widetilde{\nabla}) ( s_v^\ast \mathbf{s}) = \nabla s_v, \end{align} $$
$s_v^\ast \mathbf{s}=s_v$
. We also have
$s_v^\ast \widetilde {R}=R$
and (4.11)
$$ \begin{align}s_v^\ast \lVert \mathbf{s} \rVert^2= \lVert s_v \rVert^2= \langle s_v , s_v \rangle=-{Q\big|{}_{z_0} }(v,v). \end{align} $$
The expression for
$\varphi ^0$
then follows from the fact that
$\exp $
and
$s_v^\ast $
commute. -
(2) The bundle E is
$G(\mathbb {R})^+$
equivariant. By construction, the Mathai–Quillen form is
$G(\mathbb {R})^+$
-invariant, so
$L_g^\ast U_{MQ}=U_{MQ}$
. On the other hand, we also have (4.12)
$$ \begin{align}s_v \circ L_g(z)=L_g \circ s_{g^{-1}v}(z),\end{align} $$
and thus,
(4.13)
$$ \begin{align} L_g^\ast \varphi^0(v)=L_g^\ast s_v^\ast U_{MQ}=\varphi^0(g^{-1}v). \end{align} $$
-
(3) Since
$s_v$
is
$\Gamma _v$
-equivariant, we view it as a section (4.14)whose zero locus is precisely
$$ \begin{align} s_v \colon \Gamma_v \backslash \mathbb{D}^+ \longrightarrow \Gamma_v \backslash E, \end{align} $$
$\Gamma _v \backslash \mathbb {D}_v^+$
. Let
$S_0$
(resp.
$S_v$
) be the image in
$\Gamma _v \backslash E$
of the section
$s_v$
(resp. the zero section). By [Reference Bott and Tu2, Proposition 6.24(b)], the Thom form
$U_{MQ}$
is a Poincaré dual of the zero section
$S_0$
of E. For a form
$\omega $
in
$\Omega _c^{m-q}(\Gamma _v \backslash \mathbb {D}^+),$
we have (4.15)
$$ \begin{align} \int_{\Gamma_v \backslash \mathbb{D}^+} \varphi^0(v) \wedge \omega & = \int_{\Gamma_v \backslash \mathbb{D}^+} s_v^\ast \left ( U_{MQ} \wedge \pi ^\ast \omega \right ) \nonumber \\ & = \int_{S_v} U_{MQ} \wedge \pi ^\ast \omega \nonumber \\ & = \int_{S_v \cap S_0} \pi ^\ast \omega \nonumber \\ & = \int_{\Gamma_v \backslash \mathbb{D}_v^+} \omega. \end{align} $$
The last step follows from the fact that
$\pi ^{-1}(S_v \cap S_0)$
equals
$\Gamma _v \backslash \mathbb {D}_v^+$
.
As in (2.19), we have an isomorphism
$$ \begin{align} \left [ \Omega^q(\mathbb{D}^+) \otimes C^\infty(\mathbb{R}^{p+q}) \right ]^{G(\mathbb{R})^+} & \longrightarrow \left [ \sideset{}{^q}\bigwedge \mathfrak{p}^\ast \otimes C^\infty(\mathbb{R}^{p+q}) \right ]^K \end{align} $$
by evaluating at the basepoint
$eK$
of
$G(\mathbb {R})^+/K$
that corresponds to
$z_0$
in
$\mathbb {D}^+$
. We will now compute
${ {\varphi ^0}\big|{}_{eK} }$
.
4.2 The Mathai–Quillen form at the identity
From now on, we identify
$\mathbb {R}^{p+q}$
with
$V(\mathbb {R})$
by the orthonormal basis of (2.1), and let
$z_0$
be the negative spanned by the vectors
$e_{p+1}, \ldots , e_{p+q}$
. Hence, we identify
$z_0$
with
$\mathbb {R}^q$
and the quadratic form is
$$ \begin{align} {Q\big|{}_{z_0} }(v,v)=-\sum_{\mu=p+1}^{p+q} x_\mu^2, \end{align} $$
where
$x_{p+1}, \dots , x_{p+q}$
are the coordinates of the vector v.
Let
$f_v$
in
$\Omega ^0(G(\mathbb {R})^+,z_0)^K$
be the map associated with the section
$s_v$
, as in Proposition 3.1. It is defined by
$$ \begin{align} f_v(g)=\operatorname{pr}(g^{-1}v). \end{align} $$
Then
$df_v+\rho (\theta ) f_v$
is the horizontal lift of
$\nabla s_v$
, as discussed in Section 3.1. Let X be a vector in
$\mathfrak {g}$
, and let
$X_{\mathfrak {p}}$
and
$X_{\mathfrak {k}}$
be its components with respect to the splitting of
$\mathfrak {g}$
as
$\mathfrak {p} \oplus \mathfrak {k}$
. We have
$$ \begin{align} (df_v+\rho(\theta) f_v)_e(X)=d_ef_v(X_{\mathfrak{p}}). \end{align} $$
In particular, we can evaluate on the basis
$X_{\alpha \mu }$
and get:
$$ \begin{align} d_{e} f_v(X_{\alpha \mu}) & = \left. \frac{d}{dt} \right \rvert_{t=0} f_v(\exp tX_{\alpha \mu})\nonumber \\ & = -\operatorname{pr}(X_{\alpha \mu}v) \nonumber \\ & = -\operatorname{pr}(x_\mu e_\alpha+x_\alpha e_\mu) \nonumber\\ & = -x_{\alpha}e_\mu. \end{align} $$
So as an element of
$\mathfrak {p}^\ast \otimes z_0$
, we can write
$$ \begin{align}d_ef_v=-\sum_{\mu=p+1}^{p+q} \left ( \sum_{\alpha=1}^p x_\alpha \omega_{\alpha \mu} \right )\otimes e_\mu=-\sum_{\alpha=1}^p x_\alpha \eta_\alpha,\end{align} $$
with
Proposition 4.3 Let
$\rho (R_e)$
in
$\wedge ^2\mathfrak {p}^\ast \otimes \mathfrak {so}(z_0)$
be the curvature at the identity. Then after identifying
$\mathfrak {so}(z_0)$
with
$\wedge ^2 z_0$
, we have
$$ \begin{align} \rho(R_e)= -\frac{1}{2} \sum_{\alpha=1}^p \eta_\alpha^2 \in \wedge^2\mathfrak{p}^\ast \otimes \wedge^2 z_0, \end{align} $$
where
$\eta _\alpha ^2=\eta _\alpha \wedge \eta _\alpha $
.
Proof Using the relation
$E_{ij}E_{kl}=\delta _{il}E_{kj}$
, one can show that
$$ \begin{align} [X_{\alpha \mu},X_{\beta \nu}] =\delta_{\mu \nu} X_{\alpha \beta}+ \delta_{\alpha \beta} X_{\mu \nu} \end{align} $$
for two vectors
$X_{\alpha \nu }$
and
$ X_{\beta \mu }$
in
$\mathfrak {p}$
. Hence, we have
$$ \begin{align} R_e(X_{\alpha \nu} \wedge X_{\beta \mu}) & =[\theta(X_{\alpha \nu}), \theta(X_{\beta \mu})] -\theta([X_{\alpha \nu}, X_{\beta \mu}]) \nonumber \\ & =-\theta([X_{\alpha \nu}, X_{\beta \mu}]) \nonumber \\ & =-p\left (\delta_{\alpha \beta}X_{\nu \mu}+\delta_{\nu \mu}X_{\alpha \beta} \right ) \nonumber \\ & = -\delta_{\alpha \beta}X_{\nu \mu}. \end{align} $$
On the other hand, since
$\eta _i(X_{jr})=\delta _{ij}e_r$
, we also have
$$ \begin{align} \sum_{i=1}^p \eta_i^2(X_{\alpha \nu} \wedge X_{\beta \mu}) & = \sum_{i=1}^p \eta_i(X_{\alpha \nu}) \wedge \eta_i(X_{\beta \mu})-\eta_i(X_{\beta \mu}) \wedge \eta_i(X_{\alpha \nu}) \nonumber \\ & =2 \delta_{\alpha \beta}e_\nu \wedge e_\mu. \end{align} $$
The lemma follows since
$\rho (X_{\nu \mu })=T(e_\nu \wedge e_\mu )$
in
$\mathfrak {so}(z_0)$
, because
$$ \begin{align}Q( \rho(X_{\nu \mu})e_\nu, e_\mu ) e_\nu \wedge e_\mu =-Q( e_\mu, e_\mu ) e_\nu \wedge e_\mu=e_\nu \wedge e_\mu.\\[-34pt]\nonumber \end{align} $$
Using the fact that the exponential satisfies
$\exp (\omega +\eta )=\exp (\omega )\exp (\eta )$
on the subalgebra
$\bigoplus \Omega ^{i,i}$
—see Remark 3.1—we can write
$$ \begin{align} {{\varphi^0}\big|{}_{e} }(v) &= (- 1)^{\frac{q(q+1)}{2}} (2\pi)^{-\frac{q}{2}} \exp \left (2 \pi {Q\big|{}_{z_0} }(v,v) \right ) \int^B \prod_{\alpha=1}^p \exp \left ( 2 \sqrt{\pi} x_\alpha\eta_\alpha-\frac{1}{2}\eta_\alpha^2 \right ). \end{align} $$
We define the nth Hermite polynomial by
The first three Hermite polynomials are
$H_0(x)=1$
,
$H_1(x)=2x$
, and
$H_2(x)=4x^2-2$
.
Lemma 4.4 Let
$\eta $
be a form in
$\bigoplus \Omega ^{i,i}$
. Then
$$ \begin{align}\exp(2x \eta-\eta^2)=\sum_{n \geq 0} \frac{1}{n!}H_n(x)\eta^n, \end{align} $$
where
$H_n$
is the nth Hermite polynomial.
Proof Since
$\eta $
and
$\eta ^2$
are in
$\bigoplus \Omega ^{i,i}$
, they commute and we can use the binomial formula:
$$ \begin{align} \exp(2x \eta-\eta^2) & =\sum_{k \geq 0} \frac{1}{k!} \left (2x\eta-\eta^2 \right)^k \nonumber \\ & = \sum_{k \geq 0} \frac{1}{k!} \sum_{l=0}^k {k \choose l}(2x \eta)^{k-l}\left (-\eta^2 \right)^{l} \nonumber \\ & = \sum_{k \geq 0} \frac{1}{k!} \sum_{l=0}^k {k \choose l}(2x)^{k-l} (- 1 )^{l} \eta^{l+k} \nonumber \\ & = \sum_{n \geq 0} P_n(x)\eta^n, \end{align} $$
where
The conditions on k and l imply that n is less than or equal to
$2k$
. First, suppose that n is even. Then we have that k is between
$\frac {n}{2}$
and n, so that the sum above can be written
$$ \begin{align} \sum_{k=\frac{n}{2}}^{n}\frac{ (-1)^{n-k}}{(n-k)!(2k-n)!}(2x)^{2k-n}=&\sum_{m=0}^{\frac{n}{2}}\frac{(-1)^{\frac{n}{2}-m}}{(\frac{n}{2}-m)!(2m)!} (2x)^{2m}=\frac{1}{n!}H_n(x), \end{align} $$
where in the second step, we let m be
$k-\frac {n}{2}$
. If n is odd, then k is between
$\frac {n+1}{2}$
and n, so that the sum can be written
$$ \begin{align} \sum_{k=\frac{n+1}{2}}^{n}\frac{ (-1)^{n-k}}{(n-k)!(2k-n)!}(2x)^{2k-n}=&\sum_{m=0}^{\frac{n-1}{2}}\frac{(-1)^{\frac{n-1}{2}-m}}{(\frac{n-1}{2}-m)!(2m+1)!} (2x)^{2m+1}=\frac{1}{n!}H_n(x). \end{align} $$
Applying the lemma to (4.28), we get
$$ \begin{align} & \int^B \prod_{\alpha=1}^p \exp \left (2 \sqrt{\pi} x_\alpha\eta_\alpha-\frac{1}{2}\eta_\alpha^2 \right ) \nonumber \\ &= \int^B \prod_{\alpha=1}^p \exp \left (2 \sqrt{2\pi}x_\alpha \frac{\eta_\alpha}{\sqrt{2}}-\left (\frac{\eta_\alpha}{\sqrt{2}}\right)^2 \right ) \nonumber \\ & = \int^B \prod_{\alpha=1}^p \sum_{n \geq 0} \frac{2^{-n/2}}{n!}H_n\left (\sqrt{2\pi} x_\alpha \right )\eta_\alpha^n \nonumber \\ & = \sum_{n_1, \dots, n_p}\frac{2^{-\frac{n_1+\cdots +n_p}{2}}}{n_1! \ldots n_p!}H_{n_1}\left (\sqrt{2\pi} x_1 \right ) \ldots H_{n_p}\left (\sqrt{2\pi}x_p \right ) \int^B \eta_1^{n_1} \wedge \cdots \wedge \eta_p^{n_p}. \end{align} $$
If
$n_1+ \cdots + n_p$
is different from q, then the Berezinian of
$\eta _1^{n_1} \wedge \cdots \wedge \eta _p^{n_p}$
vanishes and we get
$$ \begin{align} & \sum_{n_1, \dots, n_p}\frac{2^{-\frac{n_1+\cdots +n_p}{2}}}{n_1! \ldots n_p!}H_{n_1}\left (\sqrt{2\pi} x_1 \right ) \ldots H_{n_p}\left (\sqrt{2\pi}x_p \right )\int^B \eta_1^{n_1} \wedge \cdots \wedge \eta_p^{n_p} \nonumber \\ = & 2^{-\frac{q}{2}}\sum_{n_1+ \dots+ n_p=q}\frac{H_{n_1}\left (\sqrt{2\pi}x_1 \right ) \ldots H_{n_p}\left (\sqrt{2\pi} x_p \right )}{n_1! \ldots n_p!} \int^B \eta_1^{n_1} \wedge \cdots \wedge \eta_p^{n_p}. \end{align} $$
Note that
$$ \begin{align} \eta_\alpha^{n_\alpha} & = \left ( \sum_{\mu=p+1}^{p+q} \omega_{\alpha \mu} \otimes e_\mu \right )^{n_\alpha} \nonumber \\ & = \sum_{\mu_1, \dots, \mu_{n_\alpha}} (\omega_{\alpha \mu_1} \otimes e_{\mu_1}) \wedge \cdots \wedge (\omega_{\alpha \mu_{n_\alpha}} \otimes e_{\mu_{n_\alpha}}) \nonumber \\ & = n_\alpha! \sum_{\mu_1< \dots< \mu_{n_\alpha}}(\omega_{\alpha \mu_1} \otimes e_{\mu_1}) \wedge \cdots \wedge (\omega_{\alpha \mu_{n_\alpha}} \otimes e_{\mu_{n_\alpha}}), \end{align} $$
where the sums are over all
$\mu _i$
’s between
$p+1$
and
$p+q$
. If
$n_1+\cdots +n_p$
is equal to
$q,$
we have
$$ \begin{align} & \int^B \eta_1^{n_1} \wedge \cdots \wedge \eta_p^{n_p} \nonumber \\ & = \int^B \prod_{\alpha=1}^{p} \left ( \sum_{\mu=p+1}^{p+q} \omega_{\alpha \mu} \otimes e_\mu \right )^{n_\alpha} \nonumber \\ & = \int^B \prod_{\alpha=1}^{p} n_\alpha! \sum_{\mu_1< \dots< \mu_{n_\alpha}}(\omega_{\alpha \mu_1} \otimes e_{\mu_1}) \wedge \cdots \wedge (\omega_{\alpha \mu_{n_\alpha}} \otimes e_{\mu_{n_\alpha}}) \nonumber \\ & = n_1! \ldots n_p! \sum \int^B (\omega_{\alpha (p+1)} \otimes e_{1}) \wedge \cdots \wedge (\omega_{\alpha (p+q)} \otimes e_{q}) \nonumber \\ & = (- 1)^{\frac{q(q+1)}{2}} n_1! \ldots n_p! \sum \omega_{\alpha_1 (p+1)} \wedge \cdots \wedge \omega_{\alpha_q (p+q)}, \end{align} $$
where the sums in the last two lines go over all tuples
$\underline {\alpha }=(\alpha _1, \dots , \alpha _q)$
with
$\alpha $
between
$1$
and p, and the value
$\alpha $
appears exactly
$n_{\alpha }$
-times in
$\underline {\alpha }$
. Hence
$$ \begin{align} {{\varphi^0}\big|{}_{e} }(v) = 2^{-q}\pi^{-\frac{q}{2}}\sum \omega_{\alpha_1 (p+1)}& \wedge \cdots \wedge \omega_{\alpha_q (p+q)} \otimes H_{n_1}\left (\sqrt{2\pi} x_1 \right ) \\ &\ldots H_{n_p}\left (\sqrt{2\pi} x_p \right )\exp \left (2\pi {Q\big|{}_{z_0} }(v,v) \right ). \nonumber \end{align} $$
After multiplying by
$\exp \left (-\pi Q(v,v) \right )$
, we get
$$ \begin{align} {{\varphi}\big|{}_{e} }(v) = 2^{-q}\pi^{-\frac{q}{2}} \sum \omega_{\alpha_1 (p+1)}& \wedge \cdots \wedge \omega_{\alpha_q (p+q)} \otimes H_{n_1}\left (\sqrt{2\pi} x_1 \right )\\ &\ldots H_{n_p}\left (\sqrt{2\pi} x_p \right )\exp \left (-\pi Q_{z_0}^+(v,v) \right ). \nonumber \end{align} $$
The form is now rapidly decreasing in v, since the Siegel majorant is positive definite. We have
$$ \begin{align} {{\varphi}\big|{}_{e} } \in \left [ \sideset{}{^q} \bigwedge \mathfrak{p}^\ast \otimes \mathscr{S}(\mathbb{R}^{p+q})\right ]^K. \end{align} $$
Theorem 4.5 We have
$2^{-\frac {q}{2}}\varphi (v)=\varphi _{KM}(v)$
.
Proof It is a straightforward computation to show that
$$ \begin{align} (2 \pi)^{-n_\alpha/2}H_{n_\alpha}\left ( \sqrt{2 \pi}x_\alpha \right )\exp(-\pi x_\alpha^2) & = \left (x_\alpha - \frac{1}{2\pi}\frac{\partial}{\partial{x_\alpha}} \right )^{n_\alpha} \exp(-\pi x_\alpha^2). \end{align} $$
Hence, applying this, we find that the Kudla–Millson form, defined by the Howe operators in (2.22), is
$$ \begin{align} {{\varphi_{KM}}\big|{}_{e} }(v) & = 2^{-q}(2\pi)^{-\frac{q}{2}} \sum \omega_{\alpha_1 (p+1)} \wedge \cdots \wedge \omega_{\alpha_q (p+q)} \otimes H_{n_1}\left (\sqrt{2\pi} x_1 \right ) \\ &\ldots H_{n_p}\left (\sqrt{2\pi} x_p \right )\exp \left (-\pi {Q\big|{}_{z_0} }(v,v) \right ) \nonumber \\ & = 2^{-\frac{q}{2}} e^{-\pi Q(v,v)}{{\varphi^0}\big|{}_{e} }(v).\nonumber\\[-34pt]\nonumber \end{align} $$
5 Examples and remarks
-
(1) Let us compute the Kudla–Millson as above in the simplest setting of signature
$(1,1)$
. Let
$V(\mathbb {R})$
be the quadratic space
$\mathbb {R}^2$
with the quadratic form
$Q(v,w)=x'y+xy'$
, where x and
$x'$
(resp. y and
$y'$
) are the components of v (respectively of w). Let
$e_1=\frac {1}{\sqrt {2}}(1,1)$
and
$e_2=\frac {1}{\sqrt {2}}(1,-1)$
. The one-dimensional negative plane
$z_0$
is
$\mathbb {R} e_2$
. If r denotes the variable on
$z_0$
, then the quadratic form is
${{Q}\big|{}_{z_0} }(r)=-r^2$
. The projection map is given by (5.1)
$$ \begin{align} \operatorname{pr} \colon V(\mathbb{R}) & \longrightarrow z_0 \nonumber \\ v=(x,x') & \longmapsto \frac{x-x'}{\sqrt{2}}. \end{align} $$
The orthogonal group of
$V(\mathbb {R})$
is (5.2)and
$$ \begin{align} G(\mathbb{R})^+=\left \{ \begin{pmatrix} t & 0 \\ 0 & t^{-1} \end{pmatrix},t>0 \right \}, \end{align} $$
$\mathbb {D}^+$
can be identified with
$\mathbb {R}_{>0}$
. The associated bundle E is
$\mathbb {R}_{>0} \times \mathbb {R}$
and the connection
$\nabla $
is simply d since the bundle is trivial. Hence, the Mathai–Quillen form is (5.3)as in the proof of Proposition 3.5. The section
$$ \begin{align} U_{MQ}=\sqrt{2}e^{-2\pi r^2}dr \in \Omega^1(E), \end{align} $$
$s_v \colon \mathbb {R}_{>0} \rightarrow E$
is given by (5.4)where x and
$$ \begin{align} s_v(t)=\left (t, \frac{t^{-1}x-tx'}{\sqrt{2}} \right ), \end{align} $$
$x'$
are the components of v. We obtain (5.5)
$$ \begin{align} s_v^\ast U_{MQ}=e^{-\pi \left ( \frac{x}{t}-tx' \right )^2}\left ( \frac{x}{t}+tx' \right ) \frac{dt}{t}. \end{align} $$
Hence, after multiplication by
$2^{-\frac {1}{2}}e^{-\pi Q(v,v)}$
, we get (5.6)
$$ \begin{align} \varphi_{KM}(x,x')= 2^{-\frac{1}{2}}e^{-\pi \left [ \left (\frac{x}{t} \right )^2+(tx')^2 \right ]}\left ( \frac{x}{t}+tx' \right ) \frac{dt}{t}. \end{align} $$
-
(2) The second example illustrates the functorial properties of the Mathai–Quillen form. Suppose that we have an orthogonal splitting of
$V(\mathbb {R})$
as
$\bigoplus _i^r V_i(\mathbb {R})$
. Let
$(p_i,q_i)$
be the signature of
$V_i(\mathbb {R})$
. We have (5.7)
$$ \begin{align} \mathbb{D}_{1} \times \cdots \times \mathbb{D}_{r} \simeq \left \{ z \in \mathbb{D} \; \vert \; z = \bigoplus_{i=1}^r z \cap V_i(\mathbb{R}) \right \}. \end{align} $$
Suppose, we fix
$z_0= z_0^1 \oplus \cdots \oplus z_0^r$
in
$\mathbb {D}^+_{1} \times \cdots \times \mathbb {D}^+_{r} \subset \mathbb {D}$
, where
$z_0^i$
is a negative
$q_i$
-plane in
$V_i(\mathbb {R})$
. Let
$G_i(\mathbb {R})$
be the subgroup preserving
$V_i(\mathbb {R})$
, let
$K_i$
be the stabilizer of
$z_0^i$
, and
$\mathbb {D}_i$
be the symmetric space associated with
$V_i(\mathbb {R})$
.Over
$\mathbb {D}^+_{1} \times \cdots \times \mathbb {D}^+_{r}$
the bundle E splits as an orthogonal sum
$E_1 \oplus \cdots \oplus E_r$
, where
$E_i$
is the bundle
$G_i(\mathbb {R})^+ \times _{K_i} z_0^i$
. Moreover, the restriction of the Mathai–Quillen form to this subbundle is (5.8)where
$$ \begin{align} {{U_{MQ}}\big|{}_{E_1 \times \cdots \times E_r} }=U_{MQ}^1 \wedge \cdots \wedge U_{MQ}^r, \end{align} $$
$U_{MQ}^i$
is the Mathai–Quillen form on
$E_i$
. The section
$s_v$
also splits as a direct sum
$\oplus s_{v_i}$
, where
$v_i$
is the projection of v onto
$v_i$
. In summary, the following diagram commutes (5.9)and we can conclude that(5.10)where
$$ \begin{align} {{\varphi_{KM}(v)}\big|{}_{\mathbb{D}_1^+ \times \cdots \times \mathbb{D}_r^+} }=\varphi_{KM}^1(v_1)\wedge \cdots \wedge \varphi_{KM}^r(v_r), \end{align} $$
$\varphi _{KM}^i$
is the Kudla–Millson form on
$\mathbb {D}_i^+$
.
-
(2) Let
$U \subset V$
be a nondegenerate r-subspace spanned by vectors
$v_1, \dots , v_r$
. Let
$(p',q')$
be the signature of U. Let
$\mathbb {D}_U$
be the subspace (5.11)When U is positive, i.e., when
$q'=0$
, then
$\mathbb {D}_U$
is in fact (5.12)In particular, when U is spanned by a single positive vector v, then
$\mathbb {D}_U=\mathbb {D}_v$
, where
$\mathbb {D}_v$
is as in (2.4). Kudla and Millson construct an
$rq$
-form
$\varphi _{KM}(v_1,\dots ,v_r)$
that is a Poincaré dual to
$\Gamma _U \backslash \mathbb {D}_U$
in
$\Gamma _U \backslash \mathbb {D}$
, where
$\Gamma _U$
is the stabilizer of U in
$\Gamma $
. One of its properties [Reference Kudla and Millson8][Lemma. 4.1] is that (5.13)
$$ \begin{align} \varphi_{KM}(v_1,\dots,v_r)=\varphi_{KM}(v_1) \wedge \cdots \wedge \varphi_{KM}(v_r). \end{align} $$
Let us explain how this form can also be recovered by the Mathai–Quillen formalism. Consider the bundle
$E^r=E \oplus \cdots \oplus E$
of rank
$rq$
over
$\mathbb {D}$
. One can check that all the “ingredients” of the Mathai–Quillen form
$U_{MQ}(E^r)$
are compatible with respect to the splitting as a direct sum, so that we have (5.14)
$$ \begin{align} U_{MQ}(E^r)=U_{MQ}(E) \wedge \dots \wedge U_{MQ}(E). \end{align} $$
On the other hand, the zero locus of the section
of
$E^r$
is precisely
$\mathbb {D}_U$
. Hence, the pullback (5.15)is a Poincaré dual of
$\mathbb {D}_U$
. Moreover, by (5.14), we have (5.16)
$$ \begin{align} \varphi^0(v_1,\dots,v_r)=\varphi^0(v_1) \wedge \cdots \wedge \varphi^0(v_r). \end{align} $$
Finally, after setting
(5.17)we get(5.18)
$$ \begin{align} 2^{-\frac{rq}{2}}\varphi(v_1,\dots, v_r) & = 2^{-\frac{rq}{2}} e^{-\pi \sum_{i=1}^r Q(v_i,v_i) }\varphi^0(v_1) \wedge \cdots \wedge \varphi^0(v_r) \nonumber\\ & = 2^{-\frac{rq}{2}} \varphi(v_1) \wedge \cdots \wedge \varphi(v_r) \nonumber\\ & = \varphi_{KM}(v_1) \wedge \cdots \wedge \varphi_{KM}(v_r) \nonumber \\ & = \varphi_{KM}(v_1,\dots,v_r). \end{align} $$
Acknowledgment
This project is part of my thesis and I thank my advisors Nicolas Bergeron and Luis Garcia for suggesting me this topic and for their support. I thank the anonymous referee for helpful comments and suggestions.
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