The m-step solvable anabelian geometry of mixed-characteristic local fields
Abstract
Let K be a mixed-characteristic local field. For an integer m ≥ 0, we denote by Km / K the maximal m-step solvable extension of K, and by GKm the maximal m-step solvable quotient of the absolute Galois group GK of K. We regard GK and its quotients as filtered profinite groups via the respective upper-numbering ramification filtrations. It is known from the previous result due to Mochizuki that the isomorphism class of K is determined by the isomorphism class of the filtered profinite group GK. In this paper, we prove that the isomorphism class of K is determined by the isomorphism class of the maximal 2-step solvable quotient GK2 as a filtered profinite group, and furthermore, that Km / K is determined functorially by the filtered profinite group GKm + 2 (resp. GKm + 3) for m ≥ 2 (resp. m = 0, 1).
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