On Singular Equivalences of Morita Type and Universal Deformation Rings for Gorenstein Algebras

Abstract

Let be a finite-dimensional algebra over a fixed algebraically closed field k of arbitrary characteristic, and let V be a finitely generated -module. It follows from results previously obtained by F.M. Bleher and the third author that V has a well-defined versal deformation ring R(, V), which is a complete local commutative Noetherian k-algebra with residue field k. The third author also proved that if is a Gorenstein k-algebra and V is a Cohen-Macaulay -module whose stable endomorphism ring is isomorphic to k, then R(, V) is universal. In this article we prove that the isomorphism class of a versal deformation ring is preserved under singular equivalence of Morita type between Gorenstein k-algebras.