Abstract
Let R be a discrete valuation ring and G a finite group. Let α: G × G → R\{0} be a generalized 2-cocycle, i.e. not necessarily taking its values in the units of R, and consider the generalized twisted group ring R*α G. In this paper we derive a criterion for R*α G. to be separable over its center. This leads us to study the center and the prime ideals of R*α G. Furthermore, we give some results on indecomposable modules over R*α G.