On Starlike Functions Associated with a Bean Shaped Domain

Abstract

In this paper, we introduce and explore a new class of starlike functions denoted by S*B, defined as follows: S*B=\f∈ A:zf'(z)/f(z) 1+z=:B(z)\. Here, B(z) represents a mapping from the unit disk onto a bean-shaped domain. Our study focuses on understanding the characteristic properties of both B(z) and the functions in S*B. We derive sharp conditions under which (p)1+(z) implies p(z) ((1+A z)/(1+B z))γ, where (p) is defined as: equation* (1-α)p(z)+α p2(z)+β zp'(z)pk(z) and (p(z))δ+β zp'(z)(p(z))k. equation* Additionally, we establish inclusion relations involving S*B and derive precise estimates for the sharp radii constants of S*B.