An improved bound on the Hausdorff dimension of Besicovitch sets in R3
Abstract
We prove that any Besicovitch set in R3 must have Hausdorff dimension at least 5/2+ε0 for some small constant ε0>0. This follows from a more general result about the volume of unions of tubes that satisfy the Wolff axioms. Our proof grapples with a new "almost counter example" to the Kakeya conjecture, which we call the SL2 example; this object resembles a Besicovitch set that has Minkowski dimension 3 but Hausdorff dimension 5/2. We believe this example may be an interesting object for future study.
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