Non-commutative resolutions for the discriminant of the complex reflection group G(m,p,2)

Abstract

We show that for the family of complex reflection groups G=G(m,p,2) appearing in the Shephard--Todd classification, the endomorphism ring of the reduced hyperplane arrangement A(G) is a non-commutative resolution for the coordinate ring of the discriminant of G. This furthers the work of Buchweitz, Faber and Ingalls who showed that this result holds for any true reflection group. In particular, we construct a matrix factorization for from A(G) and decompose it using data from the irreducible representations of G. For G(m,p,2) we give a full decomposition of this matrix factorization, including for each irreducible representation a corresponding a maximal Cohen--Macaulay module. The decomposition concludes that the endomorphism ring of the reduced hyperplane arrangement A(G) will be a non-commutative resolution.