Bohr-type inequalities for harmonic mappings with a multiple zero at the origin

Abstract

In this paper, we first determine Bohr's inequality for the class of harmonic mappings f=h+g in the unit disk , where either both h(z)=Σn=0∞apn+mzpn+m and g(z)=Σn=0∞bpn+mzpn+m are analytic and bounded in , or satisfies the condition |g'(z)|≤ d|h'(z)| in \0\ for some d∈ [0,1] and h is bounded. In particular, we obtain Bohr's inequality for the class of harmonic p-symmetric mappings. Also, we investigate the Bohr-type inequalities of harmonic mappings with a multiple zero at the origin and that most of results are proved to be sharp.