Norm estimates of the partial derivatives for harmonic mappings and harmonic quasiregular mappings

Abstract

Suppose p≥1, w=P[F] is a harmonic mapping of the unit disk D satisfying F is absolutely continuous and F∈ Lp(0, 2π), where F(eit)=ddtF(eit). In this paper, we obtain Bergman norm estimates of the partial derivatives for w, i.e., \|wz\|Lp and \|wz\|Lp, where 1≤ p<2. Furthermore, if w is a harmonic quasiregular mapping of D, then we show that wz and wz are in the Hardy space Hp, where 1≤ p≤∞. The corresponding Hardy norm estimates, \|wz\|p and \|wz\|p, are also obtained.