Abstract
For a prime number p and a free profinite group S, let S(n,p) be the nth term of its lower p-central filtration, and S[n,p] the corresponding quotient. Using tools from the combinatorics of words, we construct a canonical basis of the cohomology group H2(S[n,p], Z/p), which we call the Lyndon basis, and use it to obtain structural results on this group. We show a duality between the Lyndon basis and canonical generators of S(n,p)/S(n+1,p). We prove that the cohomology group satisfies shuffle relations, which for small values of n fully describe it.
Original language | English |
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Pages (from-to) | 973-997 |
Number of pages | 25 |
Journal | Documenta Mathematica |
Volume | 22 |
Issue number | 2017 |
DOIs | |
State | Published - 1 Jan 2017 |
Keywords
- Lower p-central filtration
- Lyndon words
- Massey products
- Profinite cohomology
- Shuffle relations
ASJC Scopus subject areas
- General Mathematics