Nonempty interior of pinned distance and tree sets

Abstract

For a compact set E⊂Rd, d≥ 2, consider the pinned distance set y(E)= |x-y| : x∈ E. Peres and Schlag showed that if the Hausdorff dimension of E is bigger than d+22 with d≥ 3, then there exists a point y∈ E such that y(E) has nonempty interior. In this paper we obtain the first non-trivial threshold for this problem in the plane, improving on the Peres--Schlag threshold when d=3, and we extend the results to trees using a novel induction argument.

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