Universal deformation rings for a class of self-injective special biserial algebras

Abstract

Let k be an algebraically closed field of arbitrary characteristic, let be a finite dimensional k-algebra and let V be a -module with stable endomorphism ring isomorphic to k. If is self-injective, then V has a universal deformation ring R(,V), which is a complete local commutative Noetherian k-algebra with residue field k. Moreover, if is further a Frobenius k-algebra, then R(,V) is stable under syzygies. We use these facts to determine the universal deformation rings of string m,N-modules whose corresponding stable endomorphism ring is isomorphic to k, and which lie either in a connected component of the stable Auslander-Reiten quiver of m,N containing a module with endomorphism ring isomorphic to k or in a periodic component containing only string m,N-modules, where m≥ 3 and N≥ 1 are integers, and m,N is a self-injective special biserial k-algebra.