Coprime Mappings and Lonely Runners

Abstract

For x real, let \ x \ be the fractional part of x (i.e. \x\ = x - x ). The lonely runner conjecture can be stated as follows: for any n positive integers v1 < v2 < … < vn there exists a real number t such that 1/(n+1) \ vi t\ n/(n+1) for i = 1, …, n. In this paper we prove that if ε >0 and n is sufficiently large (relative to ε) then such a t exists for any collection of positive integers v1 < v2 < … < vn such that vn < (2-ε)n. This is an approximate version of a natural next step for the study of the lonely runner conjecture suggested by Tao. The key ingredient in our proof is a result on coprime mappings. Let A and B be sets of integers. A bijection f:A B is a coprime mapping if a and f(a) are coprime for every a ∈ A. We show that if A,B ⊂ [n] are intervals of length 2m where m = e (( n)2) then there exists a coprime mapping from A to B. We do not believe that this result is sharp.