The Bohr compactification of an arithmetic group

Abstract

Given a group , its Bohr compactification Bohr() and its profinite completion Prof() are compact groups naturally associated to ; moreover, Prof() can be identified with the quotient of Bohr() by its connected component Bohr()0. We study the structure of Bohr() for an arithmetic subgroup of an algebraic group G over Q. When G is unipotent, we show that Bohr() can be identified with the direct product Bohr( Ab)0× Prof(), where Ab= /[, ] is the abelianization of . In the general case, using a Levi decomposition G= U H (where U is unipotent and H is reductive), we show that Bohr() can be described as the semi-direct product of a certain quotient of Bohr( U) with Bohr( H). When G is simple and has higher R-rank, Bohr() is isomorphic, up to a finite group, to the product K× Prof(), where K is the maximal compact factor of the real Lie group G(R).