Coefficients of univalent harmonic mappings
Abstract
Let SH0 denote the class of all functions f(z)=h(z)+g(z)=z+Σ∞n=2 anzn +Σ∞n=2 bnzn that are sense-preserving, harmonic and univalent in the open unit disk |z|<1. The coefficient conjecture for SH0 is still open even for |a2|. The aim of this paper is to show that if f=h+g ∈ S0H then |an| < 5.24 × 10-6 n17 and |bn| < 2.32 × 10-7n17 for all n ≥ 3. Making use of these coefficient estimates, we also obtain radius of univalence of sections of univalent harmonic mappings.
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