On the blow-up of a normal singularity at maximal Cohen-Macaulay modules

Abstract

Raynaud and Gruson developed the theory of blowing-up an algebraic variety X along a coherent sheaf M in the sense that there exists a blow-up X' of X such that the "strict transform" of M is flat over X' and the blow-up satisfies an universal (minimality) property. However, not much is known about the singularities of the blow-up. In this article, we prove that if X is a normal surface singularity and M is a reflexive OX-module, then such a blow-up arises naturally from the theory of McKay correspondence. We show that the normalization of the blow-up of Raynaud and Gruson is obtained by a resolution of X such that the full sheaf M associated to M (i.e., the reflexive hull of the pull-back of M) is globally generated and then contracting all the components of the exceptional divisor not intersecting the first Chern class of M. Moreover, we prove that if X is Gorenstein and M is special in the sense of Wunram and Riemenschneider (generalized in a previous work by Bobadilla and the author), then the blow-up of Raynaud and Gruson is normal. Finally, we use the theory of matrix factorization developed by Eisenbud, to give concrete examples of such blow-ups.