On Harmonic Entire mappings

Abstract

In this paper, we investigate properties of harmonic entire mappings. Firstly, we give the characterizations of the order and the type for a harmonic entire mapping f=h+g, respectively, and also consider the relationship between the order and the type of f, h, and g. Secondly, we investigate the harmonic mappings f=h+g such that f(np)=h(np)+g(np) are univalent in the unit disk, where \np\p=1∞ be a strictly increasing sequence of nonnegative integers. In terms of the sequence \np\p=1∞, we derive several necessary conditions for these mappings to be entire and also establish an upper bound for the order of these mappings.