English

Class-preserving automorphisms and the normalizer property for Blackburn groups

Group Theory 2008-03-07 v2 Rings and Algebras

Abstract

For a group GG, let UU be the group of units of the integral group ring ZG\mathbb{Z}G. The group GG is said to have the normalizer property if NU(G)=Z(U)G\text{N}_U(G)=\text{Z}(U)G. It is shown that Blackburn groups have the normalizer property. These are the groups which have non-normal finite subgroups, with the intersection of all of them being nontrivial. Groups GG for which class-preserving automorphisms are inner automorphisms, Outc(G)=1\text{Out}_c(G)=1, have the normalizer property. Recently, Herman and Li have shown that Outc(G)=1\text{Out}_c(G)=1 for a finite Blackburn group GG. We show that outc(G)=1\text{out}_c(G)=1 for the members GG of a few classes of metabelian groups, from which the Herman--Li result follows. Together with recent work of Hertweck, Iwaki, Jespers and Juriaans, our main result implies that, for an arbitrary group GG, the group of hypercentral units of UU is contained in Z(U)G\text{Z}(U)G.

Keywords

Cite

@article{arxiv.math/0701159,
  title  = {Class-preserving automorphisms and the normalizer property for Blackburn groups},
  author = {Martin Hertweck and Eric Jespers},
  journal= {arXiv preprint arXiv:math/0701159},
  year   = {2008}
}

Comments

10 pages. Proof of Lemma 2.2 improved. Added Example 2.3