Harmonic Univalent Mappings and Linearly Connected Domains

Abstract

We investigate the relationship between the univalence of f and of h in the decomposition f=h+g of a sense-preserving harmonic mapping defined in the unit disk D⊂C. Among other results, we determine the holomorphic univalent maps h for which there exists c>0 such that every harmonic mapping of the form f=h+g with |g'|< c|h'| is univalent. The notion of a linearly connected domain appears in our study in a relevant way.

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