Ext and Tor on two-dimensional cyclic quotient singularities

Abstract

Given two torus invariant Weil divisors D and D' on a two-dimensional cyclic quotient singularity X, the groups ExtiX(O(D),O(D')), i>0, are naturally Z2-graded. We interpret these groups via certain combinatorial objects using methods from toric geometry. In particular, it is enough to give a combinatorial description of the Ext1-groups in the polyhedra of global sections of the Weil divisors involved. Higher Exti-groups are then reduced to the case of Ext1 via a quiver. We use this description to show that Ext1X(O(D),O(K-D')) = Ext1X(O(D'),O(K-D)), where K denotes the canonical divisor on X. Furthermore, we show that Exti+2X(O(D),O(D')) is the Matlis dual of ToriX(O(D),O(D')).