On a deformation theory of finite dimensional modules over repetitive algebras

Abstract

Let be a basic finite dimensional algebra over an algebraically closed field k, and let be the repetitive algebra of . In this article, we prove that if V is a left -module with finite dimension over k, then V has a well-defined versal deformation ring R(,V), which is a local complete Noetherian commutative k-algebra whose residue field is also isomorphic to k. We also prove that R(,V) is universal provided that End(V)=k and that in this situation, R(,V) is stable after taking syzygies. We apply the obtained results to finite dimensional modules over the repetitive algebra of the 2-Kronecker algebra, which provides an alternative approach to the deformation theory of objects in the bounded derived category of coherent sheaves over P1k