Jan Minac, Federico W. Pasini, Claudio Quadrelli, Nguyen Duy Tan
Published 2018-08-05Version 1
We investigate the Galois cohomology of finitely generated maximal pro-$p$ quotients of absolute Galois groups. Assuming the well-known conjectural description of these groups, we show that Galois cohomology has the PBW property. Hence in particular it is a Koszul algebra. This answers positively a conjecture by Positselski in this case. We also provide an analogous unconditional result about Pythagorean fields. Moreover, we establish some results that relate the quadratic dual of Galois cohomology with $p$-Zassenhaus filtration on the group. This paper also contains a survey of Koszul property in Galois cohomology and its relation with absolute Galois groups.
Cohomological properties of absolute Galois groups and their profinite completion
Unramified $p$-Extensions of $\mathbf{Q}(N^{1/p})$ via Cup Products in Galois Cohomology
Detecting pro-p-groups that are not absolute Galois groups, expanded version
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