Transporting cohomology in Lazard correspondence

Abstract

Lazard correspondence provides an isomorphism of categories between finitely generated nilpotent pro-p groups of nilpotency class smaller than p and finitely generated nilpotent Zp-Lie algebras of nilpotency class smaller than p. Denote by HGri and HLiei the group cohomology functors and the Lie cohomology functors respectively. The aim of this paper is to show that for i=0, 1 and 1, and for a given category of modules the cohomology functors HGri exp and HiLie are naturally equivalent. A similar result is proven for i=3 and the relative cohomology groups.