Constrained Radius Estimates Of Certain Analytic Functions

Abstract

Let P denote the Carath\'eodory class accommodating all the analytic functions p having positive real part and satisfying p(0)=1. In this paper, the second coefficient of the normalized analytic function f defined on the open unit disc is constrained to define new classes of analytic functions. The classes are characterised by the functions f/g having positive real part or satisfying the inequality |(f(z)/g(z))-1|<1 such that f(z)(1-z2)/z and g(z)(1-z2)/z are Carath\'eodory functions for some analytic function g. This paper aims at determining radius of starlikeness for the introduced classes.