Separable deformations of the generalized quaternion group algebras

Abstract

The group algebras kQ2n of the generalized quaternion groups Q2n over fields k which contain F2n-2, are deformed to separable k((t))-algebras [kQ2n]t. The dimensions of the simple components of k((t))k((t))[kQ2n]t over the algebraic closure k((t)), and those of C Q2n over C are the same, yielding strong solutions of the Donald-Flanigan conjecture for the generalized quaternion groups.