Cofinality of Galois Cohomology within Purely Quadratic Graded Algebras

Abstract

Let p be a prime number. For a field F containing a root of unity of order p, let H(F)=H(F,Fp) be the mod-p Galois cohomology graded Fp-algebra of F. By the Norm Residue Theorem, H(F) is a purely quadratic graded-commutative algebra, and is therefore determined by the cup product H1(F)× H1(F) H2(F). We prove that the class of all Galois cohomology algebras H(F) is cofinal in the class of all purely quadratic graded-commutative Fp-algebras A, in the following sense: For every A there exists F such that the bilinear map A1× A1 A2, which determines A, embeds in the cup product bilinear map H1(F)× H1(F) H2(F). We further provide examples of Fp-bilinear maps which are not realizable by fields F in this way. These are related to recent results by Snopce-Zalesskii and Blumer-Quadrelli-Weigel on the Galois theory of pro-p right-angled Artin groups, as well as to a conjecture by Marshall on the possible axiomatization of quadratic form theory of fields.