Hostname: page-component-cd9895bd7-7cvxr Total loading time: 0 Render date: 2024-12-26T12:10:47.041Z Has data issue: false hasContentIssue false

Finite symplectic actions on the K3 lattice

Published online by Cambridge University Press:  11 January 2016

Kenji Hashimoto*
Affiliation:
Korea Institute for Advanced Study, Seoul 130-722, Korea, hashimoto@kias.re.kr
Rights & Permissions [Opens in a new window]

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

In this paper, we study finite symplectic actions on K3 surfaces X, that is, actions of finite groups G on X which act on H2,0(X) trivially. We show that the action on the K3 lattice H2(X, ℤ) induced by a symplectic action of G on X depends only on G up to isomorphism, except for five groups.

Keywords

Type
Research Article
Copyright
Copyright © Editorial Board of Nagoya Mathematical Journal 2012

References

[1] Barth, W. P., Hulek, K., Peters, C., and de Ven, A. Van, Compact Complex Surfaces, 2nd ed., Ergeb. Math. Grenzgeb. (3), Springer, Berlin, 2004.Google Scholar
[2] Besche, H. U., Eick, B., and O’Brien, E. A., A millennium project: constructing small groups, Internat. J. Algebra Comput. 12 (2002), 623644.CrossRefGoogle Scholar
[3] Burns, D. and Rapoport, M., On the Torelli problem for Kählerian K-3 surfaces, Ann. Sci. Ec. Norm. Supér. (4) 8 (1975), 235273.CrossRefGoogle Scholar
[4] Cassels, J. W. S., Rational Quadratic Forms, Lond. Math. Soc. Monogr. Ser. 13, Academic Press, New York, 1978.Google Scholar
[5] Conway, J. H. and Sloane, N. J., Sphere Packings, Lattices and Groups, 3rd ed., Grundlehren Math. Wiss. 290, Springer, New York, 1999.Google Scholar
[6] Earnest, A. G. and Hsia, J. S., Spinor norms of local integral rotations, II, Pacific J. Math. 61 (1975), 7186.Google Scholar
[7] Garbagnati, A., Symplectic automorphisms on Kummer surfaces, Geom. Dedicata 145 (2010), 219232.Google Scholar
[8] Garbagnati, A., The dihedral group D5 as group of symplectic automorphisms on K3 surfaces, preprint, arXiv:0812.4518 [math.AG] Google Scholar
[9] Garbagnati, A., Elliptic K3 surfaces with abelian and dihedral groups of symplectic automorphisms, preprint, arXiv:0904.1519 [math.AG] Google Scholar
[10] Garbagnati, A. and Sarti, A., Symplectic automorphisms of prime order on K3 surfaces, J. Algebra 318 (2007), 323350.CrossRefGoogle Scholar
[11] Garbagnati, A. and Sarti, A., Elliptic fibrations and symplectic automorphisms on K3 surfaces, Comm. Algebra 37 (2009), 36013631.CrossRefGoogle Scholar
[12] GAP Group, GAP—Groups, Algorithms, and Programming, version 4.4.12, 2008, http://www.gap-system.org Google Scholar
[13] Hashimoto, K., Period map of a certain K3 family with an S5-action, with an appendix by Terasoma, T., Reine, J. Angew. Math. 652 (2011), 165.Google Scholar
[14] Keum, J., Oguiso, K., and Zhang, D.-Q., The alternating group of degree 6 in the geometry of the Leech lattice and K3 surfaces, Proc. Lond. Math. Soc. (3) 90 (2005), 371394.Google Scholar
[15] Kondō, S., Niemeier lattices, Mathieu groups, and finite groups of symplectic automorphisms of K3 surfaces, with an appendix by S. Mukai, Duke Math. J. 92 (1998), 593603.Google Scholar
[16] Kondō, S., The maximum order of finite groups of automorphisms of K3 surfaces, Amer. J. Math. 121 (1999), 12451252.CrossRefGoogle Scholar
[17] Maxima.sourceforge.net, Maxima, a Computer Algebra System, version 5.17.0, 2009, http://maxima.sourceforge.net/ Google Scholar
[18] Mukai, S., Finite groups of automorphisms of K3 surfaces and the Mathieu group, Invent. Math. 94 (1988), 183221.CrossRefGoogle Scholar
[19] Nikulin, V. V., Finite groups of automorphisms of Kählerian surfaces of type K3 (in Russian), Uspekhi Mat. Nauk 31 (1976), 223224.Google Scholar
[20] Nikulin, V. V., Finite groups of Kählerian surfaces of type K3 (English translation), Trans. Moscow Math. Soc. 38 (1980), 71137.Google Scholar
[21] Nikulin, V. V., Integral symmetric bilinear forms and some of their applications (English translation), Math. USSR Izv. 14 (1980), 103167.CrossRefGoogle Scholar
[22] Oguiso, K., A characterization of the Fermat quartic K3 surface by means of finite symmetries, Compos. Math. 141 (2005), 404424.Google Scholar
[23] Oguiso, K. and Zhang, D.-Q., “The simple group of order 168 and K3 surfaces” in Complex Geometry (Göttingen, 2000), Springer, Berlin, 2002, 165184.Google Scholar
[24] Pjateckiĭ-Šapiro, I. I. and Šafarevič, I. R., Torelli’s theorem for algebraic surfaces of type K3 (in Russian), Izv. Akad. Nauk SSSR Ser. Mat. 35 (1971), 530572.Google Scholar
[25] Schiemann, A., The Brandt-Intrau-Schiemann table of even ternary quadratic forms, http://www.research.att.com/njas/lattices/Brandt2.html Google Scholar
[26] Serre, J.-P., Cours d’arithmétique, Presses Univ. France, Paris, 1970.Google Scholar
[27] Shioda, T. and Inose, H., “On singular K3 surfaces” in Complex Analysis and Algebraic Geometry, Iwanami Shoten, Tokyo, 1977, 119136.CrossRefGoogle Scholar
[28] Whitcher, U., Symplectic automorphisms and the Picard group of a K3 surface, preprint, arXiv:0902.0601 [math.AG] Google Scholar
[29] Xiao, G., Galois covers between K3 surfaces, Ann. Inst. Fourier (Grenoble) 46 (1996), 7388.CrossRefGoogle Scholar
[30] Zhang, D.-Q., The alternating groups and K3 surfaces, J. Pure Appl. Algebra 207 (2006), 119138.Google Scholar