Hp-Norm estimates of the partial derivatives and Schwarz lemma for α-harmonic functions

Abstract

Suppose α>-1 and 1≤ p ≤ ∞. Let f=Pα[F] be an α-harmonic mapping on D with the boundary F being absolute continuous and F∈ Lp(0,2π), where F(eiθ):=dF(eiθ)dθ. In this paper, we investigate the membership of fz and fz in the space HGp(D), the generalized Hardy space. We prove, if α>0, then both fz and fz are in HGp(D). If α<0, then fz and fz∈ HGp(D) if and only if f is analytic. Finally, we investigate a Schwartz Lemma for α-harmonic functions.