A short note on deformations of (strongly) Gorenstein-projective modules over the dual numbers

Abstract

Let k be a field of arbitrary characteristic, and let be a finite dimensional k-algebra. In this short note we prove that if V is a finitely generated strongly Gorenstein-projective left -module whose stable endomorphism ring End(V) is isomorphic to k, then V has an universal deformation ring R(,V) isomorphic to the ring of dual numbers k[ε] with ε2=0. As a consequence, we obtain the following result. Assume that Q is a finite connected acyclic quiver, let k Q be the corresponding path algebra and let = k Q[ε] = k Qk k[ε]. If V is a finitely generated Gorenstein-projective left -module with End(V)=k, then V has an universal deformation ring R(,V) isomorphic to $k[ε]