On the packing dimension of Furstenberg sets

Abstract

We prove that if α∈ (0,1/2], then the packing dimension of a set E⊂R2 for which there exists a set of lines of dimension 1 intersecting E in dimension α is at least 1/2+α+c(α) for some c(α)>0. In particular, this holds for α-Furstenberg sets, that is, sets having intersection of Hausdorff dimension α with at least one line in every direction. Together with an earlier result of T. Orponen, this provides an improvement for the packing dimension of α-Furstenberg sets over the "trivial" estimate for all values of α∈ (0,1). The proof extends to more general families of lines, and shows that the scales at which an α-Furstenberg set resembles a set of dimension close to 1/2+α, if they exist, are rather sparse.