Lipschitz conditions on bounded harmonic functions on the upper half-space

Abstract

This work is devoted to Lipschitz conditions on bounded harmonic functions on the upper half-space in Rn. Among other results we prove the following one. Let U(x',xn) be a real-valued bounded harmonic function on the upper half-space Rn+ = \(x',xn):x'∈ Rn-1, xn∈ (0,∞)\, which is continuous on the closure of this domain. Assume that for α∈ (0,1) there exists a constant C such that for every x'∈ Rn-1 we have | |U|(x',xn) - |U|(x',0)| Cxnα,\, xn∈ (0,∞). Then there exists a constant C such that |U(x) - U (y)| C |x-y|α,\, x,y∈ Rn+.