English

The Brjuno and Wilton Functions

Dynamical Systems 2025-03-12 v1

Abstract

The Brjuno and Wilton functions bear a striking resemblance, despite their very different origins; while the Brjuno function B(x)B(x) is a fundamental tool in one-dimensional holomorphic dynamics, the Wilton function W(x)W(x) stems from the study of divisor sums and self-correlation functions in analytic number theory. We show that these perspectives are unified by the semi-Brjuno function B0(x)B_0(x). Namely, B(x)B(x) and W(x)W(x) can be expressed in terms of the even and odd parts of B0(x)B_0(x), respectively, up to a bounded defect. Based on numerical observations, we further analyze the arising functions Δ+(x)=B+(x)2B0+(x)\Delta^+(x) = B^+(x) - 2B_0^+(x) and Δ(x)=W(x)2B0(x)\Delta^-(x) = W^-(x) - 2B_0^-(x), the first of which is H\"older continuous whereas the second exhibits discontinuities at rationals, behaving similarly to the classical popcorn function.

Keywords

Cite

@article{arxiv.2503.08206,
  title  = {The Brjuno and Wilton Functions},
  author = {Claire Burrin and Seul Bee Lee and Stefano Marmi},
  journal= {arXiv preprint arXiv:2503.08206},
  year   = {2025}
}

Comments

10 pages, 3 figures

R2 v1 2026-06-28T22:15:29.825Z