Non-formality of Galois cohomology modulo all primes

Abstract

Let p be a prime number and let F be a field of characteristic different from p. We prove that there exist a field extension L/F and a,b,c,d in L× such that (a,b)=(b,c)=(c,d)=0 in Br(F)[p] but a,b,c,d is not defined over L. Thus the Strong Massey Vanishing Conjecture at the prime p fails for L, and the cochain differential graded ring C*(L,Z/pZ) of the absolute Galois group L of L is not formal. This answers a question of Positselski.