Class-preserving Coleman automorphisms of finite groups with Wreathed Sylow 2-subgroups

Abstract

We show that if G is a finite group whose Sylow 2-subgroups are wreathed, then the intersection (G) (G) has odd order, where (G) and (G) denote the class-preserving and Coleman outer automorphism groups, respectively. This implies that G satisfies the normalizer problem for its integral group ring. Combined with earlier work on the dihedral and semidihedral cases, this settles the question for all three families of 2-groups of 2-rank two classified by Gorenstein--Walter and Alperin--Brauer--Gorenstein.

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