Furstenberg sets estimate in the plane

Published 17 Aug 2023 in math.CA, math.CO, and math.MG | (2308.08819v3)

Abstract: We fully resolve the Furstenberg set conjecture in $\mathbb{R}^2$, that a $(s, t)$-Furstenberg set has Hausdorff dimension $\ge \min(s+t, \frac{3s+t}{2}, s+1)$. As a result, we obtain an analogue of Elekes' bound for the discretized sum-product problem and resolve an orthogonal projection question of Oberlin.

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