A combinatorial proof of a sumset conjecture of Furstenberg

Abstract

We give a new proof of a sumset conjecture of Furstenberg that was first proved by Hochman and Shmerkin in 2012: if r / s is irrational and X and Y are × r- and × s-invariant subsets of [0,1], respectively, then H (X+Y) = ( 1, H X + H Y). Our main result yields information on the size of the sumset λ X + η Y uniformly across a compact set of parameters at fixed scales. The proof is combinatorial and avoids the machinery of local entropy averages and CP-processes, relying instead on a quantitative, discrete Marstrand projection theorem and a subtree regularity theorem that may be of independent interest.