High-low method and p-adic Furstenberg set over the plane
Abstract
We establish a p-adic analogue of a recent significant result of Ren-Wang (arXiv:2308.08819) on Furstenberg sets in the Euclidean plane. Building on the p-adic version of the high-low method from Chu (arXiv:2510.20104), we analyze cube-tube incidences in Qp2 and prove that for s < t < 2 - s, any semi-well-spaced (s,t)-Furstenberg set over Qp2 has Hausdorff dimension 3s+t2. Moreover, as a byproduct of our argument, we obtain the sharp lower bounds s+t (for 0<t s 1) and s+1 (for s+t 2) for general (s,t)-Furstenberg sets without the semi-well-spaced assumption, thereby confirming that all three lower bounds match those in the Euclidean case.
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