On Universal Deformation Rings for Gorenstein Algebras

Abstract

Let k be an algebraically closed field, and let be a finite dimensional k-algebra. We prove that if is a Gorenstein algebra, then every finitely generated Cohen-Macaulay -module V whose stable endomorphism ring is isomorphic to k has a universal deformation ring R(,V), which is a complete local commutative Noetherian k-algebra with residue field k, and which is also stable under taking syzygies. We investigate a particular non-self-injective Gorenstein algebra 0, which is of infinite global dimension and which has exactly three isomorphism classes of finitely generated indecomposable Cohen-Macaulay 0-modules V whose stable endomorphism ring is isomorphic to k. We prove that in this situation, R(0,V) is isomorphic either to k or to k[[t]]/(t2).