[PDF] Top 20 Multivalent HARMONIC FUNCTION associated with SALAGEAN OPERATOR

... In this paper we define , a class HM(u,v a) of m-valent harmonic functions involving.. Salagean Operator 15 D m  is defined and studied.[r] ... See full document

... In this paper we define , a class HM(u,v a) of m-valent harmonic functions involving.. Salagean Operator 15 D m  is defined and studied.[r] ... See full document

... [6] I. B. Jung, Y. C. Kim and H. M. srivastava, “The Hardy Space of Analytic Functions Associated with Certain One- Parameter Families of Integral Operators,” Journal of Mathematical Analysis and Applications, ... See full document

... the function f is subordinate to g, written f ≺ g or f (z) ≺ g(z)(z ∈ U), if there exists a Schwarz function w analytic in U with w(0) = 0 and |w(z)| < 1(z ∈ U ) such that f(z) = g(w(z)),(z ∈ U ...the ... See full document

... Galiz, On a Certain Subclass of Multivalent Analytic Functions Associated with a Generalized Fractional Differintegral Operator, International Journal of Mathematical Analysis, Vol.. Mad[r] ... See full document

... Making use of the principle of subordination, Miller et al. [] obtained some subordina- tion theorems involving certain integral operators for analytic functions in U. Also, Owa and Srivastava [] investigated the ... See full document

... then p is called a solution of differential superordination 2.2. An analytic function q is called a subordinant of the solutions of differential superordination 2.2, or more simply a subordinant, if q ≺ p for all p ... See full document

... of harmonic multivalent mero- morphic functions defined by generalized Liu-Srivastava operator and obtain some results including sufficient coefficient conditions, distortion bounds and extreme ... See full document

... Quite recently, q-analysis has influenced the researchers a lot due to rapid applications in mathematics and related fields. In the last century many well-known researchers (for details, see [1, 4, 6–10, 13, 14, 21, 22, ... See full document

... Following the earlier works (based upon the familiar concept of neighorhoods of analytic functions) by Goodman [12] and Ruscheweyh [30], and (more recenlty) by Altintas et al. ([1],[2] and [3]), Liu [17], and Liu and ... See full document

... analytic in the open unit disk with negative coefficient defined with the help of Hohlov operator. Characterization property, distortion theorems and some other interesting results of this class are investigated. ... See full document

... This class of functions is denoted by S ∗ p (ρ). It is noted that S ∗ p () = S ∗ p . Let f (z) and g(z) be analytic in E, we say f (z) is subordinate to g(z), written f ≺ g or f (z) ≺ g(z) if there exists a Schwarz ... See full document

... If f and g are analytic functions in U , we say that f is subordinate to g, written f ≺ g, if there is a function w analytic in U , with w(0) = 0, |w(z)| < 1, for all z ∈ U, such that f(z) = g(w(z)) for all z ∈ ... See full document

... In section 3, we give some facts about harmonic analysis related to the generalized q -Bessel operator ∆ q,α,n , we define the generalized q -Bessel transform and we give.. some propriet[r] ... See full document

... neutrosophic number weighted harmonic mean operator (NNWHMO); cosine function, score.. 31.[r] ... See full document

... In this paper, we obtain certain properties of an operator defined by the convolution between Ruscheweyh and Salagean differential operator; coefficient inequality, extreme point growth [r] ... See full document

... A continuous function f uiv is a complex-valued harmonic function in a complex domain C if both u and v are real harmonic in C. In any simply connected domain D ⊆ C, we can write f h g, where ... See full document

... Schwarz function w, analytic in U such that w0 0, |wz| < 1 z ∈ U, and fz gwz z ∈ ...the function g is univalent, then the above subordination is equivalent to f0 g0 and fU ⊂ ... See full document

... p-valent harmonic functions in the unit disc and obtain the basic properties such as coefficient bound, distortion properties, extreme points and also we apply in- tegral operator for the ... See full document

... G. Bernard Riemann showed that there always exists an analytic function f that maps a simply connected domain D 1 , onto a simply connected domain D 2 . This original version of the Riemann mapping theorem gave ... See full document