English

A Polynomial Time Test to Detect Number with Many Exceptional Points

Number Theory 2021-11-02 v1

Abstract

For each algebraic number α\alpha and each positive real number tt, the tt-metric Mahler measure mt(α)m_t(\alpha) creates an extremal problem whose solution varies depending on the value of tt. The second author studied the points tt at which the solution changes, called {\it exceptional points for α\alpha}. Although each algebraic number has only finitely many exceptional points, it is conjectured that, for every NNN \in \mathbb N, there exists a number having at least NN exceptional points. In this article, we describe a polynomial time algorithm for establishing the existence of numbers with at least NN exceptional points. Our work constitutes an improvement over the best known existing algorithm which requires exponential time. We apply our main result to show that there exist numbers with at least 3737 exceptional points, another improvement over previous work which was only able to reach 1111 exceptional points.

Keywords

Cite

@article{arxiv.2111.01002,
  title  = {A Polynomial Time Test to Detect Number with Many Exceptional Points},
  author = {Ryan Carpenter and Charles L. Samuels},
  journal= {arXiv preprint arXiv:2111.01002},
  year   = {2021}
}

Comments

12 pages

R2 v1 2026-06-24T07:21:07.143Z