Units in Integral Loop Rings

It is proved that both the Bass cyclic and bicyclic units generate a subgroup of Ž . finite index in U U ZS , assuming S is a finite semigroup such that QS is semisimple Artinian and does not contain certain types of simple components. ᮊ 1996 Aca- demic Press, Inc.

Let L be an RA loop, that is, a loop whose loop ring in any characteristic is an alternative, but not associative, ring. We find necessary and sufficient conditions Ž . for the Moufang unit loop of RL to be solvable when R is the ring of rational integers or an arbitrary field.

Let \(G\) be a finite nilpotent group so that all simple components \((D)_{n \times n}, n \geq 2\) of \(Q G\) satisfy the congruence subgroup theorem. Suppose that for all odd primes \(p\) dividing \(|G|\) the Hamiltonian quaternions \(H\) split over the \(p\) th cyclotomic field \(Q\left(\zeta_{p}\