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Moduli of K3 Surfaces and Complex Ball Quotients

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Arithmetic and Geometry Around Hypergeometric Functions

Part of the book series: Progress in Mathematics ((PM,volume 260))

Abstract

These notes are based on a series of talks given by the authors at the CIMPA Summer School on Algebraic Geometry and Hypergeometric Functions held in Istanbul in Summer of 2005. They provide an introduction to recent work on the complex ball uniformization of the moduli spaces of del Pezzo surfaces, K3 surfaces and algebraic curves of lower genus. We discuss the relationship of these constructions with the Deligne-Mostow theory of periods of hypergeometric differential forms. For convenience to a non-expert reader we include an introduction to the theory of periods of integrals on algebraic varieties with emphasis on abelian varieties and K3 surfaces.

Research of the first author is partially supported by NSF grant 0245203.

Research of the second author is partially supported by Grant-in-Aid for Scientific Research A-14204001, Japan.

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References

  1. D. Allcock, J. A. Carlson, D. Toledo, The Complex Hyperbolic Geometry of the Moduli Space of Cubic Surfaces , J. Algebraic Geometry, 11 (2002), 659?724.

    MATH   MathSciNet   Google Scholar  

  2. P. Deligne, a letter to I. M. Gelfand.

    Google Scholar  

  3. P. Deligne, G. W. Mostow, Monodromy of hypergeometric functions and nonlattice integral monodromy , Publ. Math. IHES, 63 (1986), 5?89.

    MATH   MathSciNet   Google Scholar  

  4. I. Dolgachev, Mirror symmetry for lattice polarized K3-surfaces , J. Math. Sciences 81 (1996), 2599?2630.

    Article   MATH   MathSciNet   Google Scholar  

  5. I. Dolgachev, Weighted projective varieties , in “Group actions on algebraic varieties”, Lect. Notes in Math. 956 (1982), 34?71.

    MathSciNet   Google Scholar  

  6. I. Dolgachev, B. van Geemen, S. Kond?, A complex ball uniformization of the moduli space of cubic surfaces via periods of K 3 surfaces , math.AG/0310342, J. reine angew. Math. (to appear).

    Google Scholar  

  7. Geometrie des surfaces K3: modules et periodes , Asterisque, vol. 126, Soc. Math. France, 1985.

    Google Scholar  

  8. B. van Geemen, Half twists of Hodge structure of CM-type , J. Math. Soc. Japan, 53 (2001), 813?833.

    Article   MATH   MathSciNet   Google Scholar  

  9. Ph. Griffiths, J. Harris, Principles of Algebraic Geometry , Wiley and Sons, 1994.

    Google Scholar  

  10. G. Heckman, E. Looijenga, The moduli space of rational elliptic surfaces , Adv. Studies Pure Math., 36 (2002), Algebraic Geometry 2000, Azumino, 185?248.

    Google Scholar  

  11. S. Kond?, A complex hyperbolic structure of the moduli space of curves of genus three , J. reine angew. Math., 525 (2000), 219?232.

    MathSciNet   MATH   Google Scholar  

  12. S. Kond?, The moduli space of curves of genus 4 and Deligne-Mostow’s complex reflection groups , Adv. Studies Pure Math., 36 (2002), Algebraic Geometry 2000, Azumino, 383?400.

    Google Scholar  

  13. S. Kond?, The moduli space of 8 points on ? 1 and automorphic forms , to appear in the Proceedings of the Conference “Algebraic Geometry in the honor of Professor Igor Dolgachev”.

    Google Scholar  

  14. S. Kond?, The moduli space of 5 points on ? 1 and K3 surfaces , math.AG/0507006, this volume.

    Google Scholar  

  15. E. Looijenga, Uniformization by Lauricella functions-an overview of the theory of Deligne-Mostow , math.CV/050753, this volume.

    Google Scholar  

  16. K. Matsumoto, T. Terasoma, Theta constants associated to cubic threefolds , J. Alg. Geom., 12 (2003), 741?755.

    MATH   MathSciNet   Google Scholar  

  17. G. W. Mostow, Generalized Picard lattices arising from half-integral conditions , Publ. Math. IHES, 63 (1986), 91?106.

    MATH   MathSciNet   Google Scholar  

  18. V. V. Nikulin, Integral symmetric bilinear forms and its applications , Math. USSR Izv., 14 (1980), 103?167.

    Article   MATH   Google Scholar  

  19. V. V. Nikulin, Finite automorphism groups of Kahler K 3 surfaces , Trans.Moscow Math. Soc., 38 (1980), 71?135.

    Google Scholar  

  20. V. V. Nikulin, Factor groups of groups of automorphisms of hyperbolic forms with respect to subgroups generated by 2 -reflections , J. Soviet Math., 22 (1983), 1401?1475.

    Article   MATH   Google Scholar  

  21. I. Piatetski-Shapiro, I. R. Shafarevich, A Torelli theorem for algebraic surfaces of type K 3, Math. USSR Izv., 5 (1971), 547?587.

    Article   Google Scholar  

  22. G. Shimura, On purely transcendental fields of automorphic functions of several variables , Osaka J. Math., 1 (1964), 1?14.

    MATH   MathSciNet   Google Scholar  

  23. T. Terada, Fonction hypergeometriques F 1 et fonctions automorphes , J. Math. Soc. Japan 35 (1983), 451?475; II, ibid., 37 (1985), 173?185.

    MATH   MathSciNet   Google Scholar  

  24. T. Terasoma, Infinitesimal variation of Hodge structures and the weak global Torelli theorem for complete intersections , Ann. Math., 132 (1990), 37 (1985), 213?235.

    Google Scholar  

  25. W. P. Thurston, Shape of polyhedra and triangulations of the sphere , Geometry & Topology Monograph, 1 (1998), 511?549.

    Article   MathSciNet   Google Scholar  

  26. A. Varchenko, Hodge filtration of hypergeometric integrals associated with an affine configuration of hyperplanes and a local Torelli theorem , I. M. Gelfand Seminar, Adv. Soviet Math., 16 , Part 2, Amer. Math. Soc., Providence, 1993, J. Math. Soc. Japan 35 (1983), pp. 167?177.

    Google Scholar  

  27. C. Voisin, Hodge Theory and Complex Geometry , Cambridge Studies in Adv. Math., vols. 76, 77, Cambridge Univ. Press, 2003.

    Google Scholar  

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Author information

Authors and Affiliations

  1. Department of Mathematics, University of Michigan, Ann Arbor, MI, 48109, USA

    Igor V. Dolgachev

  2. Graduate School of Mathematics, Nagoya University, Nagoya, 464-8602, Japan

    Shigeyuki Kond?

Authors
  1. Igor V. Dolgachev
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  2. Shigeyuki Kond?
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Editor information

Editors and Affiliations

  1. Institut fur Mathematik, Humboldt-Universitat zu Berlin, Unter den Linden 6, D-10099, Berlin

    Rolf-Peter Holzapfel

  2. Department of Mathematics, Galatasaray University, 34357, Besiktas, Istanbul, Turkey

    A. Muhammed Uluda?

  3. Department of Mathematics, Kyushu University, Fukuoka, 810-8560, Japan

    Masaaki Yoshida

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ⓒ 2007 Birkhauser Verlag Basel/Switzerland

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Dolgachev, I.V., Kond?, S. (2007). Moduli of K3 Surfaces and Complex Ball Quotients. In: Holzapfel, RP., Uluda?, A.M., Yoshida, M. (eds) Arithmetic and Geometry Around Hypergeometric Functions. Progress in Mathematics, vol 260. Birkhauser Basel. https://doi.org/10.1007/978-3-7643-8284-1_3

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