New class of generating functions associated with generalized hypergeometric polynomials

Making use of a linear operator, which is defined here by means of a Hadamard product (or convolution) involving the generalized hypergeometric function, the authors introduce and investigate the various properties and characteristics of two novel classes of meromorphically multivalent functions. Th

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

We deal with a class of integral transformations whose kernels contain the Clausenian hypergeometric function 3 F 2 (a 1 ; a 2 ; a 3 ; b 1 ; b 2 ; z). These transforms are deÿned in terms of integrals with respect to their parameters. It involves as particular cases the familiar Olevskii and general

For a certain class of generalized hypergcometric polynomials, the authors first derive a general theorem on bilinear, bilateral, and mixed multilateral generating functions and then apply these generating functions in order to deduce the corresponding results for the classical Jacobi and Laguerre p