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Algebraic Cycles on Quadric Sections of Cubics in ℙ4 under the Action of Symplectomorphisms

Published online by Cambridge University Press:  14 July 2015

V. Guletskiĭ
Affiliation:
Department of Mathematical Sciences, University of Liverpool, Peach Street, Liverpool L69 7ZL, UK, ([email protected])
A. Tikhomirov*
Affiliation:
Department of Mathematics, Yaroslavl State University, 108 Respublikanskaya Street, Yaroslavl 150000, Russia, ([email protected])
*
* Present address: Department of Mathematics, Higher School of Economics, 7 Vavilova Street, Moscow 117312, Russia, [email protected]

Abstract

Let τ be the involution changing the sign of two coordinates in ℙ4. We prove that τ induces the identity action on the second Chow group of the intersection of a τ-invariant cubic with a τ-invariant quadric hypersurface in ℙ4. Let lτ and Πτ be the one- and two-dimensional components of the fixed locus of the involution τ. We describe the generalized Prymian associated with the projection of a τ-invariant cubic 𝓵 ⊂ P4 from lτ onto Πτ in terms of the Prymians 𝓅2 and 𝓅3 associated with the double covers of two irreducible components, of degree 2 and 3, respectively, of the reducible discriminant curve. This gives a precise description of the induced action of the involution τ on the continuous part of the Chow group CH2 (𝓵). The action on the subgroup corresponding to 𝓅3 is the identity, and the action on the subgroup corresponding to 𝓅2 is the multiplication by —1.

Type
Research Article
Copyright
Copyright © Edinburgh Mathematical Society 2016 

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References

1. Barbieri-Viale, L., Balanced varieties, in Algebraic K-theory and its applications, pp. 298312 (World Scientific, 1999).Google Scholar
2. Beauville, A., Variétés de Prym et jacobiennes intermédiaires, Annales Scient. Ec. Norm. Sup. 10 (1977), 309391.CrossRefGoogle Scholar
3. Bloch, S. and Srinivas, V., Remarks on correspondences and algebraic cycles, Am. J. Math. 105(5) (1983), 12351253.Google Scholar
4. Clemens, H. and Griffiths, Ph., The intermediate Jacobian of the cubic threefold, Annals Math. (2) 95(2) (1972), 281356.Google Scholar
5. Deligne, P., Théorie de Hodge II, Publ. Math. IHES 49 (1971), 557.CrossRefGoogle Scholar
6. Fulton, W., Intersection theory, Ergebnisse der Mathematik und ihrer Grenzgebiete, Volume 2 (Springer, 1984).Google Scholar
7. Huybrechts, D., Chow groups and derived categories of K3-surfaces, in Current developments in algebraic geometry, Mathematical Sciences Research Institute Publications, Volume 59, pp. 177195 (Cambridge University Press, 2011).Google Scholar
8. Huybrechts, D., Symplectic automorphisms of K3-surfaces of arbitrary order, Math. Res. Lett. 19 (2012), 947951.Google Scholar
9. Huybrechts, D. and Kemeny, M., Stable maps and Chow groups, preprint (arxiv.org/abs/1202.4968, 2012).Google Scholar
10. Jannsen, U., Motivic sheaves and filtrations on Chow groups, in Motives (part 1), Proceedings of Symposia in Pure Mathematics, Volume 55, pp. 245302 (American Mathematical Society, Providence, RI, 1994).Google Scholar
11. Murre, J., Algebraic equivalence modulo rational equivalence on a cubic threefold, Compositio Math. 25(2) (1972), 161206.Google Scholar
12. Nikulin, V., Finite groups of automorphisms of Käahler K3-surfaces, Proc. Moscow Math. Soc. 38 (1980), 71135.Google Scholar
13. Pedrini, C., On the finite dimensionality of a K3-surface, Manuscr. Math. 138 (12) (2012) 5972.Google Scholar
14. Shokurov, V., Prym varieties: theory and applications, Math. USSR Izv. 23(1) (1984), 83147.CrossRefGoogle Scholar
15. Tyurin, A., Five lectures on three-dimensional varieties, Russ. Math. Surv. 27(5) (1972), 350 (in Russian).Google Scholar
16. Van Geemen, B. and Sarti, A., Nikulin involutions on K3-surfaces, Math. Z. 255(4) (2007), 731753.Google Scholar
17. Voisin, C., Sur les zéro-cycles de certaine hypersurfaces munies d’un automorphisme, Annali Scuola Norm. Sup. Pisa IV 19 (1992), 473492.Google Scholar
18. Voisin, C., Hodge theory and complex algebraic geometry, I, Cambridge Studies in Advanced Mathematics, Volume 76 (Cambridge University Press, 2002).Google Scholar
19. Voisin, C., Hodge theory and complex algebraic geometry, II, Cambridge Studies in Advanced Mathematics, Volume 77 (Cambridge University Press, 2003).Google Scholar
20. Voisin, C., Symplectic involutions of K3-surfaces act trivially on CHo , Documenta Math. 17 (2012), 851860.Google Scholar