Generalized Fesenko reciprocity map

Abstract

In this paper, which is the natural continuation and generalization of Fesenko's non-abelian reciprocity map, we extend the theory of Fesenko to infinite APF-Galois extensions L over a local field K, with finite residue-class field K of q=pf elements, satisfying μp(Ksep)⊂ K and K⊂ L⊂ Kφd where the residue-class degree [L:K]=d. More precisely, for such extensions L/K, fixing a Lubin-Tate splitting φ over K, we construct a 1-cocycle, L/K(φ):Gal(L/K) K×/NL0/KL0×× U X(L/K) /YL/L0, where L0=L Knr, and study its functorial and ramification-theoretic properties. The case d=1 recovers the theory of Fesenko.