On Milnor K-theory in the imperfect residue case and applications to period-index problems

Abstract

Given a (0,p)-mixed characteristic complete discrete valued field K we define a class of finite field extensions called pseudo-perfect extensions such that the natural restriction map on the mod-p Milnor K-groups is trivial for all p≠ 2. This implies that pseudo-perfect extensions split every element in Hi(K,μp i-1) yielding period-index bounds for Brauer classes as well as higher cohomology classes of K. As a corollary, we prove a conjecture of Bhaskhar-Haase that the Brauer p-dimension of K is upper bounded by n+1 where n is the p-rank of the residue field. When K is the fraction field of a complete regular ring, we show that any p-torsion element in Br(K) that is nicely ramified is split by a pseudo-perfect extension yielding a bound on its index. We then use patching techniques of Harbater, Hartmann and Krashen to show that the Brauer p-dimension of semi-global fields of residual characteristic p is at most n+2 and also give uniform p-bounds for higher cohomologies. These bounds are sharper than previously known in the work of Parimala-Suresh

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