Some Radius Results for Univalent Functions

The object of the present paper is to derive some interesting conditions for the class of strongly starlike functions of order ␤ and type ␣ in the open unit disk. Some examples for the special cases of our main result are also given. ᮊ 1997

## Abstract Let __S__ denote the set of normalized univalent functions in the unit disk. We consider the problem of finding the radius of convexity __r~α~__ of the set {(1 – __α__)__f__(__z__) + __αzf__′(__z__) : __f__ ∈ __S__} for fixed __α__ ∈ ℂ. Using a linearization method we find the exact

Ann. 159, 81᎐93 asserts that if the Jacobian matrix of a differentiable function from a closed rectangle K in R n into R n is a P-matrix at each point of K, then f is one-to-one on K. In this paper, by introducing the concepts of H-differentiabil-Ž . ity and H-differential of a function as a set of

## Abstract A number of integrals of scalar variables are extended to the case of matrix variables. Functions where the argument is a positive definite symmetric matrix are considered in this article. With the help of a generalized matrix transform a number of results are derived which are extensio

For 0p -1, let S denote the class of functions f z meromorphic univalent p Ž . Ž . Ž . in the unit disk ‫ބ‬ with the normalization f 0 s 0, f Ј 0 s 1, and f p s ϱ. Let Ž . S a be the subclass of S with the fixed residue a. In this note we determine the p p Ž . extreme points of the class S a . As a