On Bohr compactifications and profinite completions of group extensions

Abstract

Let G= N H be a locally compact group which is a semi-direct product of a closed normal subgroup N and a closed subgroup H. The Bohr compactification Bohr(G) and the profinite completion Prof(G) of G are, respectively, isomorphic to semi-direct products Q1 Bohr(H) and Q2 Prof(H) for appropriate quotients Q1 of Bohr(N) and Q2 of Prof(N). We give a precise description of Q1 and Q2 in terms of the action of H on appropriate subsets of the dual space of N. In the case where N is abelian, we have Bohr(G) A Bohr(H) and Prof(G) B Prof(H), where A is the group of unitary characters of N with finite H-orbits and B the subgroup of A of characters with finite image. Necessary and sufficient conditions are deduced for G to be maximally almost periodic or residually finite. We apply the results to the case where G= H is a wreath product of countable groups; we show in particular that Bohr( H) is isomorphic to Bohr( Ab H) and Prof( H) is isomorphic to Prof( Ab H), where Ab=/ [, ] is the abelianization of . As examples, we compute Bohr(G) and Prof(G) when G is a lamplighter group and when G is the Heisenberg group over a unital commutative ring.