The first partial derivatives of generalized harmonic functions

Abstract

Suppose α,β ∈ R Z- such that α+β>-1 and 1≤ p ≤ ∞. Let u=Pα,β[f] be an (α,β)-harmonic mapping on D, the unit disc of C, with the boundary f being absolutely continuous and f∈ Lp(0,2π), where f(eiθ):=ddθf(eiθ). In this paper, we investigate the membership of the partial derivatives ∂z u and ∂zu in the space HGp(D), the generalized Hardy space. We prove, if α+β>0, then both ∂z u and ∂zu are in HGp(D). For α+β<0, we show if ∂z u or ∂zu ∈ HG1(D) then u=0 or u is a polyharmonic function.