The radical of the group algebra of a sub-group, of a polycyclic group and of a restricted SN-group

Extract

Let G be a group and let K be an algebraically closed field of characteristic p>0. The twisted group algebra K^t(G) of G over K is defined as follows: let G have elements a, b, c, … and let K^t(G) be a vector space over K with basis elements , …; a multiplication is defined on this basis of K^t(G) and extended by linearity to K^t(G) by letting

where α(x, y) is a non-zero element of K, subject to the condition that

which is both necessary and sufficient for associativity. If, for all x, y ∈ G, α{x, y) is the identity of K then K^t(G) is the usual group algebra K(G) of G over K. We denote the Jacobson radical of K^t(G) by JK^t(G). We are interested in the relationship between JK^t(G) and JK^t(H) where H is a normal subgroup of G. In § 2 we show, among other results, that if certain centralising conditions are satisfied and if JK(H) is locally nilpotent then JK(H)K(G) is also locally nilpotent and thus contained in JK(G). It is observed that in the absence of some centralising conditions these conclusions are false. We show, in particular, that if H and G/C(H) are locally finite, C(H) being the centraliser of H, and if G/H has no non-trivial elements of order p, then JK(G) coincides with the locally nilpotent ideal JK(H)K(G). The latter, and probably more significant, part of this paper is concerned with particular types of groups. We introduce the notion of a restricted SN-group and show that if G is such a group and if G has no non-trivial elements of order p then JK^t(G) = {0}. It is also shown that if G is polycyclic then JK^t(G) is nilpotent.