On central automorphisms of groups and nilpotent rings

Abstract

Let G be a group. The central automorphism group Autc(G) of G is the centralizer of Inn(G) the subgroup of Aut(G) of inner automorphisms. There is a one to one map σ hσ from the set Autc(G) onto the set Hom(G,Z(G)) of homomorphisms from G onto its center, with hσ(x)=x-1 σ(x). This map can be used to obtain informations about the size of Autc(G), and also about its structure in some special cases. In this paper we see how to use it to obtain informations about the structure of Autc(G) in the general case. The notion of the adjoint group of a ring is the main tool in our approach.