The classification of reflexive modules of rank one over rational and minimally elliptic singularities

Abstract

We classify the reflexive modules of rank one over rational and minimally elliptic singularities. Equivalently, we classify full line bundles on the resolutions of rational and minimally elliptic singularities. As an application, we determine among such reflexive modules of rank one all the special ones (in the sense of Wunram) and all the flat ones. In this way, we also classify the non-flat reflexive modules as well (as a generalization of a construction of Dan and Romano). In particular, we prove (in the rank one case) a conjecture of Behnke, namely that in the case of a cusp singularity any reflexive module admits a flat connection. The results generalize the classical Mckay correspondence, and results of Artin, Verdier, Esnault, Khan and Wunram valid for different particular families of singularities.