On a Class of certain Non-Univalent Functions

Abstract

In this paper, we introduce a family of analytic functions given by A,B(z):= 1A-B1+Az1+Bz, which maps univalently the unit disk onto either elliptical or strip domains, where either A=-B=α or A=α eiγ and B=α e-iγ (α∈(0,1] and γ∈(0,π/2]). We study a class of non-univalent analytic functions defined by equation* F[A,B]:=\f∈A:( zf'(z)f(z)-1)A,B(z) \. equation* Further, we investigate various characteristic properties of A,B(z) as well as functions in the class F[A,B] and obtain the sharp radius of starlikeness of order δ and univalence for the functions in F[A,B]. Also, we find the sharp radii for functions in BS(α):=\f∈A:zf'(z)/f(z)-1 z/(1-α z2),\;α∈(0,1)\, Scs(α):=\f∈A:zf'(z)/f(z)-1 z/((1-z)(1+α z)),\;α∈(0,1)\ and others to be in the class F[A,B].