Eleven, twelve, and thirteen lonely runners

Abstract

Wills conjectured that, for any non-zero integers u1,…,uk, there is a real number t such that, for all i=1,…,k, \[ tui≥1k+1,\] where x is the distance from x to the closest integer. This statement is known as the Lonely Runner Conjecture. A computational method developed by Rosenfeld and the second author verified the conjecture for k≤9. We further refine this method with new sieving techniques and employ a polynomial method argument to show that any (u1,…,uk)(1,2,…,k)p with (u1,…,uk)=1 satisfies the conjecture when k+1 and p > k2+k are both odd primes. Ultimately, we provide a computer-assisted proof of the Lonely Runner Conjecture for k∈\10,11,12\.