English

Rational Interpreters for Discrete Dynamics: Existence, Exactness, and Decomposition over $p$-adic Fields

Dynamical Systems 2026-02-06 v1 Commutative Algebra Algebraic Geometry Combinatorics Number Theory

Abstract

We address an inverse problem in non-Archimedean dynamics: given a finite discrete dynamical system (equivalently, a functional graph on NN states), construct a continuous pp-adic dynamical system whose residue-level behavior reproduces the prescribed transitions. Using the cylinder partition of OK\mathcal{O}_K (viewed as \emph{Witt cylinders} for unramified K/QpK/\mathbb{Q}_p), we encode states by pairwise disjoint closed balls and formalize an \textbf{interpreter} as a map sending each state ball into its target ball. Our main existence result constructs rational interpreters that are analytic (hence pole-free) on the prescribed state cylinders, combining rigid-analytic Runge approximation with finite interpolation constraints. Under a linear-dominance condition on each cylinder, ball images are explicit and locally affine, leading to a robust classification of discrete behavior into contractive, indifferent, and expansive regimes. Good reduction provides a selection principle for natural interpreters; effective degree and height bounds for general rational interpreters remain open. For composite alphabets we prove a \textbf{Dynamic Chinese Remainder Theorem} for congruence-preserving systems: the CRT isomorphism Θ:Z/mZiZ/pikiZ\Theta:\mathbb{Z}/m\mathbb{Z}\xrightarrow{\sim}\prod_i\mathbb{Z}/p_i^{k_i}\mathbb{Z} (for m=pikim=\prod p_i^{k_i}) yields a factorization of the \emph{dynamics} (equivalently, the functional graph) on Z/mZ\mathbb{Z}/m\mathbb{Z} into dynamics on the prime-power components, compatible with reduction. Finally, we discuss an inverse-limit (profinite) extension: compatible towers define a 11-Lipschitz map on Zp\mathbb{Z}_p, while selecting compatible analytic/rational interpreters across levels becomes a separate problem.

Keywords

Cite

@article{arxiv.2602.05433,
  title  = {Rational Interpreters for Discrete Dynamics: Existence, Exactness, and Decomposition over $p$-adic Fields},
  author = {J. Rogelio Pérez-Buendía},
  journal= {arXiv preprint arXiv:2602.05433},
  year   = {2026}
}

Comments

49 pages, 5 figures

R2 v1 2026-07-01T09:37:28.946Z