On universal deformation rings and stable equivalences of Gorenstein-projective modules

Abstract

Let k be a field and let Λ and Γ finite dimensional k-algebras. Assume that ΓXΛ and ΛYΓ are bimodules that define a singular equivalence of Morita type with level (in the sense of Z. Wang) between Λ and Γ and which also induce an equivalence between the stable categories of finitely generated Gorenstein-projective modules Λ-Gproj and Γ-Gproj. We prove that if V is an indecomposable object in Λ-Gproj with EndΛ(V) k, then XΛV is an object in Γ-Gproj such that EndΓ(XΛV) k and the universal deformation rings (in the sense of F.M. Bleher and the second author) R(Λ,V) and R(Γ, XΛV) are isomorphic. This result generalizes the one obtained by the second author assuming that Λ and Γ are Gorenstein k-algebras.