SL2 over group rings of cyclic groups

The theory developed in previous papers of the author is used to compute the algebraic K of group rings of cyclic p-groups with coefficients in an arbitrary 2 -ring.

In this paper, we show that for any Schur ring S over a cyclic group G, if every subgroup is an S-subgroup, then S is either a wedge product of Schur rings over smaller cyclic groups, or every S-principal subset is an orbit of an element under a Ž fixed subgroup of Aut G. With an earlier result prov

Let p ) 2 be a prime, R s ‫ޚ‬ , K s ‫ޑ‬ , and G s SL p . The p p y1 p p y1 2 group ring RG is calculated nearly up to Morita equivalence: The projections of RG into the simple components of KG are given explicitly and the endomorphism rings and homomorphism bimodules between the projective indecompo

In this paper, Mäurer's theorems characterizing certain subgroups of the projective group PGL 2 K over a field K are generalized to the case of rings.  2002 Elsevier Science (USA)