Add to ORKGAbstract. Let T (n) be the class of functions with negative coefficients which are analytic in the unit disc U. For functions f1(z) and f2(z) belonging to T (n), generalizations of the Hadamard product of f1(z) and f2(z) denoted by f1∆f2(p, q; z) are introduced. In the present paper, some interesting properties of these generalizations of Hadamard products of functions in Tn(λ, α) and Cn(λ, α) are given. MSC 2000. 30C45. Key words. Hadamard product, analytic functions
AbstractIn this paper, we introduce new subclasses of analytic and univalent functions and establish...
summary:In the present paper, we establish some interesting results concerning the quasi-Hadamard pr...
AbstractIn this paper, the author established certain results concerning the quasi-Hadamard product ...
AbstractLet T(n) be the class of functions with negative coefficients which are analytic in the unit...
The object of the present paper is to derive several interesting properties of the class Tn(; ) cons...
We introduce the classes Kn* of analytic functions with negative coefficients by using the nth order...
AbstractLet f(z)=∑n=0∞anzn and g(z)=∑n=0∞bnzn be analytic in the unit disk. The Hadamard product of ...
AbstractLet A be the class of functions ƒ(z), which are analytic in the unit disc U = {z: |z| < 1}, ...
Abstract. We introduce the subclass Tj(n,m, λ, α) of analytic functions with negative coefficients d...
In this note we employ the Salagean differential operator to the familiar Hadamard product (or convo...
AbstractA recent result of Shigeyoshi Owa (Math. Japon. 27 (4), (1982), 409–416) concerning the Hada...
Abstract. The objective of the present paper is to show quasi-Hadamard prod-ucts of some families of...
Abstract. By using a certain linear operator defined by a Hadamard product or convolution, several i...
[[abstract]]Using Hadamard product, we define a new class differential operator. By applying this op...
In this paper, we study a subclass of functions which are univalent and analytic functions in the un...
AbstractIn this paper, we introduce new subclasses of analytic and univalent functions and establish...
summary:In the present paper, we establish some interesting results concerning the quasi-Hadamard pr...
AbstractIn this paper, the author established certain results concerning the quasi-Hadamard product ...
AbstractLet T(n) be the class of functions with negative coefficients which are analytic in the unit...
The object of the present paper is to derive several interesting properties of the class Tn(; ) cons...
We introduce the classes Kn* of analytic functions with negative coefficients by using the nth order...
AbstractLet f(z)=∑n=0∞anzn and g(z)=∑n=0∞bnzn be analytic in the unit disk. The Hadamard product of ...
AbstractLet A be the class of functions ƒ(z), which are analytic in the unit disc U = {z: |z| < 1}, ...
Abstract. We introduce the subclass Tj(n,m, λ, α) of analytic functions with negative coefficients d...
In this note we employ the Salagean differential operator to the familiar Hadamard product (or convo...
AbstractA recent result of Shigeyoshi Owa (Math. Japon. 27 (4), (1982), 409–416) concerning the Hada...
Abstract. The objective of the present paper is to show quasi-Hadamard prod-ucts of some families of...
Abstract. By using a certain linear operator defined by a Hadamard product or convolution, several i...
[[abstract]]Using Hadamard product, we define a new class differential operator. By applying this op...
In this paper, we study a subclass of functions which are univalent and analytic functions in the un...
AbstractIn this paper, we introduce new subclasses of analytic and univalent functions and establish...
summary:In the present paper, we establish some interesting results concerning the quasi-Hadamard pr...
AbstractIn this paper, the author established certain results concerning the quasi-Hadamard product ...