Mixed thresholds in the Lonely Runner Conjecture
摘要
The Lonely Runner Conjecture states that if runners start at the same point on a unit-length circular track and run with distinct constant speeds, then each runner is at some time at least -distant from every other runner. Equivalently, for every tuple of distinct positive integer speeds , there is a real number such that for all . We introduce and study a version of the conjecture in which the required distances may vary with . For , let be the set of vectors such that, for every choice of distinct positive integer speeds , there is a real number with for all . We give an exact characterization of . We also use Fourier series for distance-threshold indicator functions to obtain an arithmetic progression summation formula and an exact two-function integral formula for unequal thresholds.
引用
@article{arxiv.2605.27941,
title = {Mixed thresholds in the Lonely Runner Conjecture},
author = {Alathea Jensen},
journal= {arXiv preprint arXiv:2605.27941},
year = {2026}
}