A fractal-like configuration of point-line pairs for the minimal distance problem

Abstract

We show that for every n ∈ N there is a collection of points p1, …, pn and lines 1, …, n in the unit square such that for any i we have pi ∈ i and the distance from pi to any other line j is at least c nγ-1 for some universal constants c, γ>0. This is better than a trivial construction by a polynomial factor.

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