Bounded functions on the character variety

Abstract

This paper is motivated by an open question in p-adic Fourier theory, that seems to be more difficult than it appears at first glance. Let L be a finite extension of Qp with ring of integers oL and let Cp denote the completion of an algebraic closure of Qp. In their work on p-adic Fourier theory, Schneider and Teitelbaum defined and studied the character variety X. This character variety is a rigid analytic curve over L that parameterizes the set of locally L-analytic characters λ : (oL,+) (Cp×,×). One of the main results of Schneider and Teitelbaum is that over Cp, the curve X becomes isomorphic to the open unit disk. Let L(X) denote the ring of bounded-by-one functions on X. If μ ∈ oL [\![oL]\!] is a measure on oL, then λ μ(λ) gives rise to an element of L(X). The resulting map oL [\![oL]\!] L(X) is injective. The question is: do we have L(X) = oL [\![oL]\!]? In this paper, we prove various results that were obtained while studying this question. In particular, we give several criteria for a positive answer to the above question. We also recall and prove the ``Katz isomorphism'' that describes the dual of a certain space of continuous functions on oL. An important part of our paper is devoted to providing a proof of this theorem which was stated in 1977 by Katz. We then show how it applies to the question. Besides p-adic Fourier theory, the above question is related to the theory of formal groups, the theory of integer valued polynomials on oL, p-adic Hodge theory, and Iwasawa theory.