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Paper detail

Random runners are very lonely

Suppose that $k$ runners having different constant speeds run laps on a circular track of unit length. The Lonely Runner Conjecture states that, sooner or later, any given runner will be at distance at least $1/k$ from all the other runners. We prove that, with probability tending to one, a much stronger statement holds for random sets in which the bound $1/k$ is replaced by \thinspace $1/2-\varepsilon $. The proof uses Fourier analytic methods. We also point out some consequences of our result for colouring of random integer distance graphs.

preprint2012arXivOpen access
Sebastian Czerwiński
math.COmath.NT
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Sebastian Czerwiński

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