New estimates on the size of (α,2α)-Furstenberg sets
Abstract
We use recent advances on the discretized sum-product problem to obtain new bounds on the Hausdorff dimension of planar (α,2α)-Fursterberg sets. This provides a quantitative improvement to the 2α+ε bound of H\'era-Shmerkin-Yavicoli. In particular, we show that every 1/2-Furstenberg set has dimension at least 1 + 1/4536.
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