On the cohomology of Frobenius algebras II: Crossed products

We investigate the problem of explicitly constructing non-cyclic free groups in finite-dimensional crossed products using valuation criteria. The results are applied to produce explicit free groups in division algebras generated by nilpotent groups, and symmetric free groups in group rings of finite

We study the Hochschild cohomology of a finite-dimensional preprojective algebra; this is periodic by a result of A. Schofield. We determine the ring structure of the Hochschild cohomology ring given by the Yoneda product. As a result we obtain an explicit presentation by generators and relations.

Under mild conditions on the space X, we describe the additive structure of the integral cohomology of the space X p = EC in terms of the cohomology of X. ## C p p We give weaker results for other similar spaces, and deduce various corollaries concerning the cohomology of finite groups.