On Some Subclass of Harmonic Close-to-convex Mappings

Abstract

Let H denote the class of harmonic functions f in D:= \z∈ C:|z| < 1\ normalized by f(0) = 0 = fz(0) -1. For α ≥ 0, we consider the following class W0H(α):= \f = h + g∈H: Re\,(h'(z) + α z h''(z)) >|g'(z) + α z g''(z)|, z∈ D\. In this paper, we first prove the coefficient conjecture of Clunie and Sheil-Small for functions in the class W0H(α). We also prove growth theorem, convolution, convex combination properties for functions in the class W0H(α). Finally, we determine the value of r so that the partial sums of functions in the class W0H(α) are close-to-convex in |z|<r.