On the Hausdorff dimension of Furstenberg sets and orthogonal projections in the plane

Abstract

Let 0 ≤ s ≤ 1 and 0 ≤ t ≤ 2. An (s,t)-Furstenberg set is a set K ⊂ R2 with the following property: there exists a line set L of Hausdorff dimension H L ≥ t such that H (K ) ≥ s for all ∈ L. We prove that for s∈ (0,1), and t ∈ (s,2], the Hausdorff dimension of (s,t)-Furstenberg sets in R2 is no smaller than 2s + ε, where ε > 0 depends only on s and t. For s>1/2 and t = 1, this is an ε-improvement over a result of Wolff from 1999. The same method also yields an ε-improvement to Kaufman's projection theorem from 1968. We show that if s ∈ (0,1), t ∈ (s,2] and K ⊂ R2 is an analytic set with H K = t, then H \e ∈ S1 : H πe(K) ≤ s\ ≤ s - ε, where ε > 0 only depends on s and t. Here πe is the orthogonal projection to span(e).

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