Ramification theory and perfectoid spaces
Abstract
Let K and F be complete discrete valuation fields of residue characteristic p>0. Let m be a positive integer no more than their absolute ramification indices. Let s and t be their uniformizers. Let L/K and E/F be finite extensions such that the modulo s^m of the extension O_L/O_K and modulo t^m of O_E/O_F are isomorphic. Let j=<m be a positive rational number. In this paper, we prove that the ramification of L/K is bounded by j if and only if the ramification of E/F is bounded by j. As an application, we prove that the categories of finite separable extensions of K and F whose ramifications are bounded by j are equivalent to each other, which generalizes a theorem of Deligne to the case of imperfect residue fields. We also show the compatibility of Scholl's theory of higher fields of norms with the ramification theory of Abbes-Saito, and the integrality of small Artin and Swan conductors of abelian extensions of mixed characteristic.
Keywords
Cite
@article{arxiv.1304.5895,
title = {Ramification theory and perfectoid spaces},
author = {Shin Hattori},
journal= {arXiv preprint arXiv:1304.5895},
year = {2019}
}
Comments
43 pages; Section 2 and 3 revised, the original Section 4 divided into sections, an error in Section 6 corrected, Cor. 6.3 added, other minor changes