Lower bounds on Bourgain’s constant for harmonic measure
Canadian journal of mathematics, Tome 76 (2024) no. 6, pp. 1967-1986
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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, Acta Mathematica 161, 131–144) proved that $b_2=1$. When $n\geq 3$, Bourgain (1987, Inventiones Mathematicae 87, 477–483) proved that $b_n>0$ and Wolff (1995, Essays on Fourier analysis in honor of Elias M. Stein (Princeton, NJ, 1991), Princeton University Press, Princeton, NJ, 321–384) produced examples showing $b_n<1$. Refining Bourgain’s original outline, we prove that $$\begin{align*}b_n\geq c\,n^{-2n(n-1)}/\ln(n),\end{align*}$$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 $b_4\geq 2\times 10^{-26}$.
Mots-clés :
Harmonic measure, Hausdorff dimension, Bourgain’s estimate, Frostman’s lemma, net measures
Badger, Matthew; Genschaw, Alyssa. Lower bounds on Bourgain’s constant for harmonic measure. Canadian journal of mathematics, Tome 76 (2024) no. 6, pp. 1967-1986. doi: 10.4153/S0008414X2300069X
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author = {Badger, Matthew and Genschaw, Alyssa},
title = {Lower bounds on {Bourgain{\textquoteright}s} constant for harmonic measure},
journal = {Canadian journal of mathematics},
pages = {1967--1986},
year = {2024},
volume = {76},
number = {6},
doi = {10.4153/S0008414X2300069X},
url = {http://geodesic.mathdoc.fr/articles/10.4153/S0008414X2300069X/}
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