Invariance of the Initial Coefficient Differences of Ma-Minda Convex Functions

Abstract

Let Φ be a univalent function in D=\z∈ C:|z|<1\% , Φ(D) is symmetric with respect to the real axis, starlike with respect to Φ(0)=1, and Φ (0)>0. Let C% (Φ) denote the class of Ma-Minda convex functions. In this article, we present the bounds on ||a3|-|a2|| for Taylor's coefficients of the function f in the class C(Φ). We also establish the same bounds for the inverse coefficients. All the bounds we study here are sharp. We also present the conditions such that the bounds on |a3|-|a2|| and |A3|-|A2|| are invariant, where A2 and A3 are the first two coefficients of the Taylor series of the inverse functions of f∈ C(Φ). Thus provides examples of invariance and nonvariance among the subclasses of convex functions.