Deformation rings which are not local complete intersections

Abstract

We study the inverse problem for the versal deformation rings R(,V) of finite dimensional representations V of a finite group over a field k of positive characteristic p. This problem is to determine which complete local commutative Noetherian rings with residue field k can arise up to isomorphism as such R(,V). We show that for all integers n 1 and all complete local commutative Noetherian rings W with residue field k, the ring W[[t]]/(pn t,t2) arises in this way. This ring is not a local complete intersection if pnW≠\0\, so we obtain an answer to a question of M. Flach in all characteristics.