Central units of integral group rings

Abstract

We give an explicit description for a basis of a subgroup of finite index in the group of central units of the integral group ring G of a finite abelian-by-supersolvable group such that every cyclic subgroup of order not a divisor of 4 or 6 is subnormal in G. The basis elements turn out to be a natural product of conjugates of Bass units. This extends and generalizes a result of Jespers, Parmenter and Sehgal showing that the Bass units generate a subgroup of finite index in the center Z ( ( G)) of the unit group ( G) in case G is a finite nilpotent group. Next, we give a new construction of units that generate a subgroup of finite index in Z(( G)) for all finite strongly monomial groups G. We call these units generalized Bass units. Finally, we show that the commutator group ( G)/( G)' and Z(( G)) have the same rank if G is a finite group such that G has no epimorphic image which is either a non-commutative division algebra other than a totally definite quaternion algebra, or a two-by-two matrix algebra over a division algebra with center either the rationals or a quadratic imaginary extension of . This allows us to prove that in this case the natural images of the Bass units of G generate a subgroup of finite index in ( G)/( G)'.