Symmetries and connected components of the AR-quiver

Abstract

Let (A,m) be a commutative complete equicharacteristic Gorenstein isolated singularity of dimension d with k = A/m algebraically closed. Let (A) be the AR (Auslander-Reiten) quiver of A. Let P be a property of maximal Cohen-Macaulay A-modules. We show that some naturally defined properties P define a union of connected components of (A). So in this case if there is a maximal Cohen-Macaulay module satisfying P and if A is not of finite representation type then there exists a family \ Mn \n ≥ 1 of maximal Cohen-Macaulay indecomposable modules satisfying P with multiplicity e(Mn) > n. Let (A) be the stable quiver. We show that there are many symmetries in (A). As an application we show that if (A,m) is a two dimensional Gorenstein isolated singularity with multiplicity e(A) ≥ 3 then for all n ≥ 1 there exists an indecomposable self-dual maximal Cohen-Macaulay A-module of rank n.