Ties in Function Field Prime Races
Number Theory
2026-04-07 v3
Abstract
The function field analogue of Chebyshev's bias was first studied by Cha. In this paper, we study *ties* in this race, namely collections of distinct congruence classes for which holds for infinitely many . We provide infinitely many examples of for which the tie holds whenever satisfies certain congruence conditions. We give two different proofs: first, via the explicit formula for prime counts in terms of -functions together with a matrix analogue of M\"obius inversion, where exceptional pairs of Galois-conjugate elements in the corresponding cyclotomic fields produce ties; and second, via an explicit bijection arising from the -action. Our examples also include characteristic 2 cases.
Cite
@article{arxiv.2603.21005,
title = {Ties in Function Field Prime Races},
author = {Graeme Bates and Ryan Jesubalan and Seewoo Lee and Jane Lu and Hyewon Shim},
journal= {arXiv preprint arXiv:2603.21005},
year = {2026}
}
Comments
24 pages, 6 tables