Some remarks on the lonely runner conjecture

Abstract

The lonely runner conjecture of Wills and Cusick, in its most popular formulation, asserts that if n runners with distinct constant speeds run around a unit circle R/ Z starting at a common time and place, then each runner will at some time be separated by a distance of at least 1n+1 from the others. In this paper we make some remarks on this conjecture. Firstly, we can improve the trivial lower bound of 12n slightly for large n, to 12n + c nn2 ( n)2 for some absolute constant c>0; previous improvements were roughly of the form 12n + cn2. Secondly, we show that to verify the conjecture, it suffices to do so under the assumption that the speeds are integers of size nO(n2). We also obtain some results in the case when all the velocities are integers of size O(n).