Some subclasses of meromorphically multivalent functions associated with the generalized hypergeometric function

Making use of a linear operator, which is defined here by means of the Hadamard product (or convolution), involving the generalized hypergeometric function, we introduce two novel subclasses Ω p,q,s (α 1 ; A, B, λ) and Ω + p,q,s (α 1 ; A, B, λ) of meromorphically multivalent functions of order λ (0

Using the generalized hypergeometric function, we study a class Φ p k (q, s; A, B, λ) of analytic functions with negative coefficients. Coefficient estimates, distortion theorem, extreme points and the radii of close-to-convexity and convexity for this class are given. We also derive many results fo

In this paper, we introduce and investigate various inclusion relationships and convolution properties of a certain class of meromorphically p-valent functions, which are defined in this paper by means of a linear operator.

In this paper, we find the necessary and sufficient conditions for functions zF (a, b; c; z) in the generalized class of β uniformly starlike and β uniformly convex functions of order α and also consequences of the results are pointed out.

Making use of a certain linear operator, which is defined here by means of the Hadamard product (or convolution), we introduce two novel subclasses P a,c (A, B; p, λ) and P + a,c (A, B; p, λ) of the class A( p) of normalized p-valent analytic functions in the open unit disk. The main objective of t

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