Dimensions of Furstenberg sets and an extension of Bourgain's projection theorem

Abstract

We show that the Hausdorff dimension of (s,t)-Furstenberg sets is at least s+t/2+ε, where ε>0 depends only on s and t. This improves the previously best known bound for 2s<t 1+ε(s,t), in particular providing the first improvement since 1999 to the dimension of classical s-Furstenberg sets for s<1/2. We deduce this from a corresponding discretized incidence bound under minimal non-concentration assumptions, that simultaneously extends Bourgain's discretized projection and sum-product theorems. The proofs are based on a recent discretized incidence bound of T.~Orponen and the first author and a certain duality between (s,t) and (t/2,s+t/2)-Furstenberg sets.

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