Universal deformation rings of string modules over a certain symmetric special biserial algebra

Abstract

Let be an algebraically closed field, let be a finite dimensional -algebra and let V be a -module with stable endomorphism ring isomorphic to . If is self-injective then V has a universal deformation ring R(,V), which is a complete local commutative Noetherian -algebra with residue field . Moreover, if is also a Frobenius -algebra then R(,V) is stable under syzygies. We use these facts to determine the universal deformation rings of string -modules whose stable endomorphism ring isomorphic to , where is a symmetric special biserial -algebra that has quiver with relations depending on the four parameters r=(r0,r1,r2,k) with r0,r1,r2≥ 2 and k≥ 1.