Composita Stability Theorems for Enhanced Koszul Properties in Galois Cohomology

Abstract

We investigate how enhanced Koszul properties of Galois cohomology behave under composita of fields. Given fields K1 and K2 containing μp, with intersection k and compositum K = K1K2, we formulate an abstract composita stability theorem: under a pro-p amalgam decomposition GK GK1 *Gk GK2 of maximal pro-p Galois groups, and natural Mayer-Vietoris compatibility assumptions on the mod-p cohomology rings H(GK1, Fp), H(GK2, Fp), and H(Gk, Fp), the quadratic presentation of H(GK, Fp) arises from a fiber-product construction on degree-1 generators and quadratic relations. Assuming stability of universal Koszulity under this quadratic gluing, we obtain that universal Koszulity of H(GK1, Fp) and H(GK2, Fp) implies universal Koszulity of H(GK, Fp). As a concrete application, we prove a composita stability theorem for certain Pythagorean fields whose maximal pro-2 Galois groups decompose as free pro-2 products of Demuskin groups and free factors. For suitable composita K = K1K2 of such fields, the mod-2 Galois cohomology ring H(GK(2), F2) remains quadratic and universally Koszul. This provides large classes of fields, built from local, global, and Pythagorean base fields by admissible extensions and composita, whose maximal pro-p Galois groups have universally Koszul cohomology, and yields inverse Galois obstructions: any finitely generated pro-p group with nonquadratic or non-universally Koszul mod-p cohomology cannot occur as the maximal pro-p Galois group of a field in these families.