On Deformations of Gorenstein-projective modules over Nakayama and triangular matrix algebras

Abstract

Let k be a fixed field of arbitrary characteristic, and let be a finite dimensional k-algebra. Assume that V is a left -module of finite dimension over k. F. M. Bleher and the author previously proved that V has a well-defined versal deformation ring R(,V) which is a local complete commutative Noetherian ring with residue field isomorphic to k. Moreover, R(,V) is universal if the endomorphism ring of V is isomorphic to k. In this article we prove that if is a basic connected cycle Nakayama algebra without simple modules and V is a Gorenstein-projective left -module, then R(,V) is universal. Moreover, we also prove that the universal deformation rings R(,V) and R(, V) are isomorphic, where V denotes the first syzygy of V. This result extends the one obtained by F. M. Bleher and D. J. Wackwitz concerning universal deformation rings of finitely generated modules over self-injective Nakayama algebras. In addition, we also prove the following result concerning versal deformation rings of finitely generated modules over triangular matrix finite dimensional algebras. Let =pmatrix & B\\0& pmatrix be a triangular matrix finite dimensional Gorenstein k-algebra with of finite global dimension and B projective as a left -module. If pmatrix V\pmatrixf is a finitely generated Gorenstein-projective left -module, then the versal deformation rings R(,pmatrix V\pmatrixf) and R(,V) are isomorphic.