J. G. Llorente, J. J. Manfredi, W. C. Troy, J. M. Wu
Published 2018-07-26Version 1
For all $1<p<\infty$ and $N\ge 2$ we prove that there is a constant $\alpha(p,N)>0$ such that the $p$-harmonic measure in $\R^N_+$ of a ball of radius $0 < \delta \leq 1$ in $\R^{N-1}$ is bounded above and below by a constant times $\delta ^{\alpha (p.N)}$. We provide explicit estimates for the exponent $\alpha(p,N)$
A counterexample regarding a two-phase problem for harmonic measure in VMO
Positive solutions and harmonic measure for Schrödinger operators in uniform domains
Hausdorff dimension and $σ$ finiteness of $p-$harmonic measures in space when $p\geq n$
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