Radius of concavity for certain class of functions

Abstract

Let S(p) be the class of all meromorphic univalent functions defined in the unit disc D of the complex plane with a simple pole at z=p and normalized by the conditions f(0)=0 and f(0)=1 . In this paper, we find radius of concavity and compute the same for functions in S(p) and for some other well-known classes of functions on unit disk. We explore general linear combinations F(z):=λ1f1(z)+·s+λ2n f2n(z),\; λj∈C , n∈N , of functions belonging to the class S(p) and some other classes of functions of analytic univalent functions and investigate their radii of univalence, convexity and concavity.