Radius of Close-to-convexity of Harmonic Functions

Abstract

Let H denote the class of all normalized complex-valued harmonic functions f=h+g in the unit disk D, and let K=H+G denote the harmonic Koebe function. Let an,bn, An, Bn denote the Maclaurin coefficients of h,g,H,G, and F=\f=h+g∈ H:\,|an|≤ An and |bn|≤ Bn for n≥ 1. We show that the radius of univalence of the family F is 0.112903.... We also show that this number is also the radius of the starlikeness of F. Analogous results are proved for a subclass of the class of harmonic convex functions in H. These results are obtained as a consequence of a new coefficient inequality for certain class of harmonic close-to-convex functions. Surprisingly, the new coefficient condition helps to improve Bloch-Landau constant for bounded harmonic mappings.