Singular equivalences of Morita type with level, Gorenstein algebras, and universal deformation rings

Abstract

Let k be a field of arbitrary characteristic, let be a finite dimensional k-algebra, and let V be an indecomposable finitely generated non-projective Gorenstein-projective left -module whose stable endomorphism ring is isomorphic to k. In this article, we prove that the universal deformation rings R(,V) and R(, V) are isomorphic, where V denotes the first syzygy of V as a left -module. We also prove the following result. Assume that is Gorenstein and that is another Gorenstein k-algebra such that there exists ≥ 0 and a pair of bimodules (X, Y) that induces a singular equivalence of Morita type with level (as introduced by Z. Wang) between and . Then the left -module X V is also Gorenstein-projective with stable endomorphism ring isomorphic to k and the universal deformation ring R(, X V) is isomorphic to R(, V).