Integral operators preserving certain analytic functions

Let A A be the class of normalized analytic functions in the unit disk ⌬ and define the class

This paper is concerned with integral operators which are defined by means of continuous kernel functions. We give necessary and sufficient conditions imposed on the kernels such that families of continuous functions with various distinctive forms are left invariant under the corresponding operators

Let denote the class of functions of the form f (z) = 1 z + ∞ k=1 a k z k which are analytic in 0 < |z| < 1. Two new integral operators P α β and Q α β defined on are introduced. This paper gives some subordination and convolution properties of certain subclasses of meromorphic functions which are d

In this paper we investigate a class of p-valent analytic functions with ÿxed argument of coe cient, which is deÿned in terms of certain di erential-integral operators. Coe cient estimates, distortion theorems, extreme points, the radii of convexity and starlikeness in this class are given.