Matrix factorization for quasi-homogeneous singularities

Abstract

Given an isolated, quasi-homogeneous singularity X we prove that there is a group isomorphism between the group of rank one reflexive sheaves on X and the free abelian group generated by C*-divisors, modulo linear equivalence. When (X)=2 we reduce the problem of finding matrix factorizations of arbitrary reflexive OX-modules to the same question on rank one reflexive sheaves. We then enumerate the matrix factorizations of all rank one reflexive sheaves. As a consequence, we prove a conjecture of Etingof and Ginzburg on point modules.