Sufficiency for Nephroid Starlikeness using Hypergeometric Functions

Abstract

Let A consists of analytic functions f:D satisfying f(0)=f'(0)-1=0. Let S*Ne be the recently introduced Ma-Minda type functions family associated with the 2-cusped kidney-shaped nephroid curve ((u-1)2+v2-49)3-4 v23=0 given by align* S*Ne:= \f∈A:zf'(z)f(z) Ne(z)=1+z-z3/3\. align* In this paper, we adopt a novel technique that uses the geometric properties of hypergeometric functions to determine sharp estimates on β so that each of the differential subordinations align* p(z)+β zp'(z) cases 1+z; 1+z; ez; cases align* imply p(z)Ne(z), where p(z) is analytic satisfying p(0)=1. As applications, we establish conditions that are sufficient to deduce that f∈A is a member of S*Ne.