A McKay correspondence for reflection groups

Abstract

We construct a noncommutative desingularization of the discriminant of a finite reflection group G as a quotient of the skew group ring A=S*G. If G is generated by order two reflections, then this quotient identifies with the endomorphism ring of the reflection arrangement A(G) viewed as a module over the coordinate ring SG/() of the discriminant of G. This yields, in particular, a correspondence between the nontrivial irreducible representations of G to certain maximal Cohen--Macaulay modules over the coordinate ring SG/(). These maximal Cohen--Macaulay modules are precisely the nonisomorphic direct summands of the coordinate ring of the reflection arrangement A (G) viewed as a module over SG/(). We identify some of the corresponding matrix factorizations, namely the so-called logarithmic (co-)residues of the discriminant.