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Lower bounds on Bourgain's constant for harmonic measure
Published 30 May 2022 in math.CA and math.AP | (2205.15101v2)
Abstract: For every $n\geq 2$, Bourgain's constant $b_n$ is the largest number such that the (upper) Hausdorff dimension of harmonic measure is at most $n-b_n$ for every domain in $\mathbb{R}n$ on which harmonic measure is defined. Jones and Wolff (1988) proved that $b_2=1$. When $n\geq 3$, Bourgain (1987) proved that $b_n>0$ and Wolff (1995) produced examples showing $b_n<1$. Refining Bourgain's original outline, we prove that [ b_n\geq c\,n{-2n(n-1)}/\ln(n)] for all $n\geq 3$, where $c>0$ is a constant that is independent of $n$. We further estimate $b_3\geq 1\times 10{-15}$ and $b_4\geq 2\times 10{-26}$.
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