English

Integer-valued polynomials and $p$-adic Fourier theory

Number Theory 2025-04-16 v2

Abstract

The goal of this paper is to give a numerical criterion for an open question in pp-adic Fourier theory. Let FF be a finite extension of Qp\mathbf{Q}_p. Schneider and Teitelbaum defined and studied the character variety X\mathfrak{X}, which is a rigid analytic curve over FF that parameterizes the set of locally FF-analytic characters λ:(oF,+)(Cp×,×)\lambda : (o_F,+) \to (\mathbf{C}_p^\times,\times). Determining the structure of the ring ΛF(X)\Lambda_F(\mathfrak{X}) of bounded-by-one functions on X\mathfrak{X} defined over FF seems like a difficult question. Using the Katz isomorphism, we prove that if F=Qp2F= \mathbf{Q}_{p^2}, then ΛF(X)=oF[ ⁣[oF] ⁣]\Lambda_F(\mathfrak{X}) = o_F [\![o_F]\!] if and only if the oFo_F-module of integer-valued polynomials on oFo_F is generated by a certain explicit set. Some computations in SageMath indicate that this seems to be the case.

Keywords

Cite

@article{arxiv.2502.18053,
  title  = {Integer-valued polynomials and $p$-adic Fourier theory},
  author = {Laurent Berger and Johannes Sprang},
  journal= {arXiv preprint arXiv:2502.18053},
  year   = {2025}
}

Comments

16 pages. v2: minor edits and corrections

R2 v1 2026-06-28T21:57:05.268Z