Universal Deformation Rings for Complexes over Finite-Dimensional Algebras

Abstract

Let k be field of arbitrary characteristic and let be a finite dimensional k-algebra. From results previously obtained by F.M Bleher and the author, it follows that if V is an object of the bounded derived category Db(-mod) of , then V has a well-defined versal deformation ring R(, V), which is complete local commutative Noetherian k-algebra with residue field k, and which is universal provided that HomDb(-mod)(V, V)=k. Let Dsg(-mod) denote the singularity category of and assume that V is a bounded complex whose terms are all finitely generated Gorenstein projective left -modules. In this article we prove that if HomDsg(-mod)(V, V)=k, then the versal deformation ring R(, V) is universal. We also prove that certain singular equivalences of Morita type (as introduced by X. W. Chen and L. G. Sun) preserve the isomorphism class of versal deformation rings of bounded complexes whose terms are finitely generated Gorenstein projective -modules.