Estimates of conjugate harmonic functions with given set of singularities with application

Abstract

Let E be an arbitrary closed set on the unit circle ∂ D, u be a harmonic function on the unit disk D satisfying |u(z)| (1-|z|)γ -q(z) where (z)= dist(z, E), γ, q are some real constants, γ q. We establish an estimate of the conjugate u of the same type which is sharp in some sense and in the case E=∂ D coincides with known estimates. As an application we describe growth classes defined by the non-radial condition |u(z)| -q(z) in terms of smoothness of the Stieltjes measure associated to the harmonic function u.