On the density of sets of the Euclidean plane avoiding distance 1

Abstract

A subset A ⊂ R2 is said to avoid distance 1 if: ∀ x,y ∈ A, \| x-y \|2 ≠ 1. In this paper we study the number m1( R2) which is the supremum of the upper densities of measurable sets avoiding distance 1 in the Euclidean plane. Intuitively, m1( R2) represents the highest proportion of the plane that can be filled by a set avoiding distance 1. This parameter is related to the fractional chromatic number f( R2) of the plane. We establish that m1( R2) ≤ 0.25647 and f( R2) ≥ 3.8991.