An improved bound on the packing dimension of Furstenberg sets in the plane

Abstract

Let 0 ≤ s ≤ 1. A set K ⊂ R2 is a Furstenberg s-set, if for every unit vector e ∈ S1, some line Le parallel to e satisfies H [K Le] ≥ s. The Furstenberg set problem, introduced by T. Wolff in 1999, asks for the best lower bound for the dimension of Furstenberg s-sets. Wolff proved that H K ≥ \s + 1/2,2s\ and conjectured that H K ≥ (1 + 3s)/2. The only known improvement to Wolff's bound is due to Bourgain, who proved in 2003 that H K ≥ 1 + ε for Furstenberg 1/2-sets K, where ε > 0 is an absolute constant. In the present paper, I prove a similar ε-improvement for all 1/2 < s < 1, but only for packing dimension: p K ≥ 2s + ε for all Furstenberg s-sets K ⊂ R2, where ε > 0 only depends on s. The proof rests on a new incidence theorem for finite collections of planar points and tubes of width δ > 0. As another corollary of this theorem, I obtain a small improvement for Kaufman's estimate from 1968 on the dimension of exceptional sets of orthogonal projections. Namely, I prove that if K ⊂ R2 is a linearly measurable set with positive length, and 1/2 < s < 1, then H \e ∈ S1 : p πe(K) ≤ s\ ≤ s - ε for some ε > 0 depending only on s. Here πe is the orthogonal projection onto the line spanned by e.