In this paper we consider the class Σ p (λ, α, β, k, c) consisting of analytic meromorphic functions and with fixed second coefficients .In the present paper we have obtained coefficient inequalities for the class Σ p (λ, α, β, k, c). Also we have shown that this class is closed under arithmetic mean and convex linear combinations. Lastly we have obtained extreme points, growth and distortion bounds and the radius of meromorphically starlikeness for functions in the class Σ p (λ, α, β, k, c).
In this paper, we introduced a new class of p-valent analytic functions using a linear multiplier Dziok-Srivastava operator D m,q,s p,λ, f (z)(m ∈ N 0 = {0, 1, ...}, q ≤ s + 1; q, s ∈ N 0 , λ ≥ 0, ≥ 0). Hölders inequalities results and modified Hadamard produt for functions belonging to this class are obtained.
In this paper we investigate a family of linear operator defined on the space of univalent functions. By making use of this linear operator, we introduce and investigate some new subclasses of uniformly starlike, uniformly convex, uniformly close-to-convex and uniformly quasi-convex univalent functions. Also we establish some inclusion relationships associated with the aforementioned linear operator. Some interesting integral-preserving properties are also considered.
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