中文

La correspondance de McKay

代数几何 2007-05-23 v1

摘要

Let M be a quasiprojective algebraic manifold with K_M=0 and G a finite automorphism group of M acting trivially on the canonical class K_M; for example, a subgroup G of SL(n,C) acting on C^n in the obvious way. We aim to study the quotient variety X=M/G and its resolutions Y -> X (especially under the assumption that Y has K_Y=0) in terms of G-equivariant geometry of M. At present we know 4 or 5 quite different methods of doing this, taken from string theory, algebraic geometry, motives, moduli, derived categories, etc. For G in SL(n,C) with n=2 or 3, we obtain several methods of cobbling together a basis of the homology of Y consisting of algebraic cycles in one-to-one correspondence with the conjugacy classes or the irreducible representations of G.

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引用

@article{arxiv.math/9911165,
  title  = {La correspondance de McKay},
  author = {Miles Reid},
  journal= {arXiv preprint arXiv:math/9911165},
  year   = {2007}
}

备注

20 pages, uses Latex and bourbaki.cls. S\'eminaire Bourbaki, 52\`eme ann\'ee, novembre 1999, no. 867, to appear in Ast\'erisque 2000