Super-H\"older vectors and the field of norms

Abstract

Let E be a field of characteristic p. In a previous paper of ours, we defined and studied super-H\"older vectors in certain E-linear representations of Zp. In the present paper, we define and study super-H\"older vectors in certain E-linear representations of a general p-adic Lie group. We then consider certain p-adic Lie extensions K∞ / K of a p-adic field K, and compute the super-H\"older vectors in the tilt of K∞. We show that these super-H\"older vectors are the perfection of the field of norms of K∞ / K. By specializing to the case of a Lubin-Tate extension, we are able to recover E((Y)) inside the Y-adic completion of its perfection, seen as a valued E-vector space endowed with the action of OK× given by the endomorphisms of the corresponding Lubin-Tate group.