A note on deformations of finite dimensional modules over k-algebras
Abstract
Let k be a field, and let be a (not necessarily finite dimensional) k-algebra. Let V be a left -module such that is finite dimensional over k. Assume further that V has a weak universal deformation ring Rw(,V), which is a complete Noetherian commutative local k-algebra with residue field k. We prove in this note that under certain conditions on the -module V, that if Rw(,V) is a quotient of k[\![t]\!], then Rw(,V) is either isomorphic to k, or k[\![t]\!], or to k[\![t]\!]/(tN) for some integer N≥ 2.
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