Groups with the same cohomology as their pro-p completions

Abstract

For any prime p and group G, denote the pro-p completion of G by Gp. Let C be the class of all groups G such that, for each natural number n and prime number p, Hn(Gp, Z/p) Hn(G, Z/p), where Z/p is viewed as a discrete, trivial Gp-module. In this article we identify certain kinds of groups that lie in C. In particular, we show that right-angled Artin groups are in C and that this class also contains some special types of free products with amalgamation.