Hostname: page-component-76fb5796d-vfjqv Total loading time: 0 Render date: 2024-04-29T15:13:33.691Z Has data issue: false hasContentIssue false
  • English
  • Français

Algebraic K3 surfaces with finite automorphism groups

Published online by Cambridge University Press:  22 January 2016

Shigeyuki Kondō
Rights & Permissions [Opens in a new window]

Extract

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.

The purpose of this paper is to give a proof to the result announced in [3]. Let X be an algebraic surface defined over C. X is called a K3 surface if its canonical line bundle Kx is trivial and dim H1(X, ϕX) = 0. It is known that the automorphism group Aut (X) of X is isomorphic, up to a finite group, to the factor group O(Sx)/Wx, where O(Sx) is the automorphism group of the Picard lattice of X (i.e. Sx is the Picard group of X together with the intersection form) and Wx is its subgroup generated by all reflections associated with elements with square (–2) of Sx ([11]). Recently Nikulin [8], [10] has completely classified the Picard lattices of algebraic K3 surfaces with finite automorphism groups.

Type
Research Article
Information
Nagoya Mathematical Journal , Volume 116 , December 1989 , pp. 1 - 15
Copyright
Copyright © Editorial Board of Nagoya Mathematical Journal 1989

References

[1] Kodaira, K., On compact analytic surfaces II, Ann. Math., 77 (1963), 563626. III, Ann. Math., 78 (1963), 140.Google Scholar
[2] Kondō, S., Enriques surfaces with finite automorphism groups, Japanese J. Math. (New Series), 12, (1986), 191282.Google Scholar
[3] Kondō, S., On algebraic K3 surfaces with finite automorphism groups, Proc. Japan Acad., 62, Ser. A, No. 9 (1986), 353355.Google Scholar
[4] Kondō, S., On automorphisms of algebraic K3 surfaces which acts trivially on Picard groups, Proc. Japan Acad., 62, Ser. A, No. 9 (1986), 356359.Google Scholar
[5] Mukai, S., Finite groups of automorphisms of K3 surfaces and the Mathieu group, Invent, math., 94 (1988), 183221.Google Scholar
[6] Nikulin, V. V., Finite automorphism groups of Kahler surfaces of type K3 , Proc. Moscow Math. Soc, 38 (1979), 75137.Google Scholar
[7] Nikulin, V. V., Integral symmetric bilinear forms and some of their applications, Math. USSR Izv., 14 (1980), 103167.Google Scholar
[8] Nikulin, V. V., On the quotient groups of the automorphism groups of hyperbolic forms by the subgroups generated by 2-reflections, J. Soviet Math., 22 (1983), 14011476.Google Scholar
[9] Nikulin, V. V., On a description of the automorphism groups of Enriques surfaces, Soviet Math. Dokl., 30 (1984), 282285.Google Scholar
[10] Nikulin, V. V., Surfaces of type K3 with a finite automorphism group and a Picard group of rank three, Proc. Steklov Institute of Math. Issue, 3 (1985), 131155.Google Scholar
[11] Piatetskii-Shapiro, I., Shafarevich, I. R., A Torelli theorem for algebraic surfaces of type K3 , Math. USSR Izv., 35 (1971), 530572.Google Scholar
[12] Shioda, T., On elliptic modular surfaces, J. Math. Soc. Japan, 24 (1972), 2059.Google Scholar
[13] Vinberg, E. B., On groups of unit elements of certain quadratic forms, Math. USSR Sbornik, 16 (1972), 1735.Google Scholar
[14] Vinberg, E. B., Some arithmetic discrete groups in Lobachevskii spaces, in “Discrete sub groups of Lie groups and applications to Moduli”, Tata-Oxford (1975), 323348.Google Scholar