The p-Zassenhaus Filtration of a Free Profinite Group and Shuffle Relations

Abstract

For a prime number p and a free profinite group S on the basis X, let S(n,p), n=1,2,…, be the p-Zassenhaus filtration of S. For p>n, we give a word-combinatorial description of the cohomology group H2(S/S(n,p),Z/p) in terms of the shuffle algebra on X. We give a natural linear basis for this cohomology group, which is constructed by means of unitriangular representations arising from Lyndon words.