Unit groups of integral finite group rings with no noncyclic abelian finite subgroups
Abstract
It is shown that in the units of augmentation one of an integral group ring Z G of a finite group G, a noncyclic subgroup of order p2, for some odd prime p, exists only if such a subgroup exists in G. The corresponding statement for p=2 holds by the Brauer--Suzuki theorem, as recently observed by W. Kimmerle.
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