Harmonic Close-to-convex Functions and Minimal Surfaces

Abstract

In this paper, we study the family CH0 of sense-preserving complex-valued harmonic functions f that are normalized close-to-convex functions on the open unit disk D with fz(0)=0. We derive a sufficient condition for f to belong to the class H0. We take the analytic part of f to be zF(a,b;c;z) or zF(a,b;c;z2) and for a suitable choice of co-analytic part of f, the second complex dilatation w(z)=fz/fz turns out to be a square of an analytic function. Hence f is lifted to a minimal surface expressed by an isothermal parameter. Explicit representation for classes of minimal surfaces are given. Graphs generated by using Mathematica are used for illustration.