A. Logunov, E. Malinnikova, P. Mozolyako
Published 2014-06-22, updated 2014-08-27Version 2
We consider harmonic functions in the unit ball of $\mathbb{R}^{n+1}$ that are unbounded near the boundary but can be estimated from above by some (rapidly increasing) radial weight $w$. Our main result gives some conditions on $w$ that guarantee the estimate from below on the harmonic function by a multiple of this weight. In dimension two this reverse estimate was first obtained by M. Cartwright for the case of the power weights, $w_p(z)=(1-|z|)^{-p}$ for $p>1$, and then generalized to a wide class of regular weights by a number of authors.
Comments: v.2, 18 pages, added references and acknowledgements, some typos removed
On the Gradient of Harmonic Functions
Boundary oscillations of harmonic functions in Lipschitz domains
Carleson's $\varepsilon^2$ conjecture in higher dimensions
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