Applied Mathematics and Information Sciences, ISSN 1935-0090, 05/2018, Volume 12, Issue 3, pp. 469 - 481

Journal Article

Proyecciones, ISSN 0716-0917, 03/2014, Volume 33, Issue 1, pp. 77 - 90

Pochhammer symbol | Umbral calculus | Hermite-Kamṕe de F́eriet polynomials | Monoumbral expansions | Lagrange polynomials | Multinomial theorem and multinomial coefficients | Principle of monoumbrality | Erku̧s-Srivastava polynomials | Lagrange-Hermite polynomials | Chan-Chyan-Srivastava polynomials

Journal Article

Filomat, ISSN 0354-5180, 2018, Volume 32, Issue 6, pp. 2101 - 2114

The main object of this paper is to introduce and study systematically the univalence criteria of a new family of integral operators by using a substantially...

Srivastava-Attiya Operator | Integral operators | Mellin-Barnes contour integral | Hadamard product (or convolution) | Analytic functions | Series representations | Univalent functions | λ-Generalized Hurwitz-Lerch function | Fox’s H-function | MATHEMATICS | MATHEMATICS, APPLIED | lambda-Generalized Hurwitz-Lerch function | Fox's H-function | FAMILY

Srivastava-Attiya Operator | Integral operators | Mellin-Barnes contour integral | Hadamard product (or convolution) | Analytic functions | Series representations | Univalent functions | λ-Generalized Hurwitz-Lerch function | Fox’s H-function | MATHEMATICS | MATHEMATICS, APPLIED | lambda-Generalized Hurwitz-Lerch function | Fox's H-function | FAMILY

Journal Article

Asian-European Journal of Mathematics, ISSN 1793-5571, 2014, Volume 7, Issue 2

Journal Article

数学学报：英文版, ISSN 1439-8516, 2013, Volume 29, Issue 5, pp. 833 - 840

In this paper, we consider a new class CS＊s,b of generalized close-to-starlike functions, which is defined by means of the Srivastava-Attiya operator Js,b...

星象函数 | 关闭 | 广义 | 塔 | 瓦斯 | Hurwitz | Zeta函数 | 操作定义 | 30C10 | close-to-starlike functions | 30C45 | inclusion results | Analytic functions | coefficient bounds | 11M35 | Mathematics | Srivastava-Attiya operator | coefficient inequalities | starlike functions | convex functions | Mathematics, general | hadamard product (or convolution) | MATHEMATICS, APPLIED | MATHEMATICS | FAMILIES | APOSTOL-BERNOULLI | EULER | Computer science | Universities and colleges | Studies | Algebra | Operators | Coefficients | Mathematical analysis | Joints | Inequalities

星象函数 | 关闭 | 广义 | 塔 | 瓦斯 | Hurwitz | Zeta函数 | 操作定义 | 30C10 | close-to-starlike functions | 30C45 | inclusion results | Analytic functions | coefficient bounds | 11M35 | Mathematics | Srivastava-Attiya operator | coefficient inequalities | starlike functions | convex functions | Mathematics, general | hadamard product (or convolution) | MATHEMATICS, APPLIED | MATHEMATICS | FAMILIES | APOSTOL-BERNOULLI | EULER | Computer science | Universities and colleges | Studies | Algebra | Operators | Coefficients | Mathematical analysis | Joints | Inequalities

Journal Article

Taiwanese Journal of Mathematics, ISSN 1027-5487, 12/2011, Volume 15, Issue 6, pp. 2751 - 2762

While investigating the Lauricella's list of 14 complete second-order hypergeometric series in three variables, Srivastava noticed the existence of three...

Hypergeometric functions | Mathematical integrals | Mathematical functions | Beta and gamma functions | Srivastava's triple hypergeometric functions ha | Exton's functions | Appell functions | Picard's integral formula | Eulerian integrals | Bessel functions | Hb and hc | Confluent hypergeometric functions | Multiple hypergeometric functions | Gauss hypergeometric function 2f1 | Laplace integrals | Humbert functions | Srivastava's triple hypergeometric functions H-A, H-B and H-C | DECOMPOSITION FORMULAS | Gauss hypergeometric function F-2 | MATHEMATICS | Beta and Gamma functions

Hypergeometric functions | Mathematical integrals | Mathematical functions | Beta and gamma functions | Srivastava's triple hypergeometric functions ha | Exton's functions | Appell functions | Picard's integral formula | Eulerian integrals | Bessel functions | Hb and hc | Confluent hypergeometric functions | Multiple hypergeometric functions | Gauss hypergeometric function 2f1 | Laplace integrals | Humbert functions | Srivastava's triple hypergeometric functions H-A, H-B and H-C | DECOMPOSITION FORMULAS | Gauss hypergeometric function F-2 | MATHEMATICS | Beta and Gamma functions

Journal Article

Abstract and Applied Analysis, ISSN 1085-3375, 7/2014, Volume 2014, pp. 1 - 11

There are many articles in the literature dealing with the first-order and the second-order differential subordination and superordination problems for...

MATHEMATICS | PRESERVING SUBORDINATION | SUBCLASSES | GENERALIZED HYPERGEOMETRIC FUNCTION | THEOREMS | UNIVALENT | LINEAR OPERATOR | ANALYTIC-FUNCTIONS | Functions | Algorithms | Research | Functional equations | Mathematical research | Operator theory | Theorems

MATHEMATICS | PRESERVING SUBORDINATION | SUBCLASSES | GENERALIZED HYPERGEOMETRIC FUNCTION | THEOREMS | UNIVALENT | LINEAR OPERATOR | ANALYTIC-FUNCTIONS | Functions | Algorithms | Research | Functional equations | Mathematical research | Operator theory | Theorems

Journal Article

Applied Mathematics and Computation, ISSN 0096-3003, 01/2015, Volume 251, pp. 35 - 45

In this paper, we present a unified class of analytic functions defined by a new convolution operator J(λp),(μq),bs,a,λ introduced recently by Srivastava and...

Starlike functions | Srivastava–Attiya operator | Generalized Hurwitz–Lerch zeta function | Convex functions | Srivastava–Gaboury operator | Analytic functions | Generalized Hurwitz-Lerch zeta function | Srivastava-Gaboury operator | Srivastava-Attiya operator | MATHEMATICS, APPLIED | SUBCLASSES | UNIVALENT | BERNOULLI | FAMILY | STARLIKE | EULER | Operators | Theorems | Convolution | Computation | Mathematical analysis | Inequalities | Distortion | Mathematical models

Starlike functions | Srivastava–Attiya operator | Generalized Hurwitz–Lerch zeta function | Convex functions | Srivastava–Gaboury operator | Analytic functions | Generalized Hurwitz-Lerch zeta function | Srivastava-Gaboury operator | Srivastava-Attiya operator | MATHEMATICS, APPLIED | SUBCLASSES | UNIVALENT | BERNOULLI | FAMILY | STARLIKE | EULER | Operators | Theorems | Convolution | Computation | Mathematical analysis | Inequalities | Distortion | Mathematical models

Journal Article

Journal of Applied Analysis, ISSN 1425-6908, 06/2018, Volume 24, Issue 1, pp. 1 - 16

Recently, the notion of positive linear operators by means of basic (or -) Lagrange polynomials and -statistical convergence was introduced and studied in [M....

41A36 | Korovkin-type approximation theorems | Lagrange polynomials | Lipschitz class | rate of convergence | 40A05 | modulus of continuity | Chan–Chyan–Srivastava polynomials | 40G15 | Statistical convergence | q)-Chan-Chyan-Srivastava polynomials | deferred weighted A-statistical convergence | Korovkin-typeapproximation theorems | basic (or q-) Chan-Chyan-Srivastava polynomials | Chan-Chyan-Srivastava polynomials | Lagrange multiplier | Polynomials | Banach spaces | Mathematical analysis | Approximations

41A36 | Korovkin-type approximation theorems | Lagrange polynomials | Lipschitz class | rate of convergence | 40A05 | modulus of continuity | Chan–Chyan–Srivastava polynomials | 40G15 | Statistical convergence | q)-Chan-Chyan-Srivastava polynomials | deferred weighted A-statistical convergence | Korovkin-typeapproximation theorems | basic (or q-) Chan-Chyan-Srivastava polynomials | Chan-Chyan-Srivastava polynomials | Lagrange multiplier | Polynomials | Banach spaces | Mathematical analysis | Approximations

Journal Article

Applied Mathematics and Computation, ISSN 0096-3003, 03/2014, Volume 230, pp. 496 - 508

By making use of the principle of differential subordination and the Dziok–Srivastava convolution operator, we introduce and investigate three interesting...

Starlike and convex functions | Subordination between analytic functions | Hadamard product (or convolution) | Fox–Wright hypergeometric function | Analytic and univalent functions | Carlson–Shaffer and Dziok–Srivastava convolution operators | Generalized Pochhammer’s symbol | Srivastava–Wright operator | Carlson-Shaffer and Dziok-Srivastava convolution operators | Fox-Wright hypergeometric function | Srivastava-Wright operator | Generalized Pochhammer's symbol | MATHEMATICS, APPLIED | GENERALIZED HYPERGEOMETRIC-FUNCTIONS | Operators | Convolution | Computation | Mathematical analysis | Disks | Mathematical models | Inclusions

Starlike and convex functions | Subordination between analytic functions | Hadamard product (or convolution) | Fox–Wright hypergeometric function | Analytic and univalent functions | Carlson–Shaffer and Dziok–Srivastava convolution operators | Generalized Pochhammer’s symbol | Srivastava–Wright operator | Carlson-Shaffer and Dziok-Srivastava convolution operators | Fox-Wright hypergeometric function | Srivastava-Wright operator | Generalized Pochhammer's symbol | MATHEMATICS, APPLIED | GENERALIZED HYPERGEOMETRIC-FUNCTIONS | Operators | Convolution | Computation | Mathematical analysis | Disks | Mathematical models | Inclusions

Journal Article

Applied Mathematics and Computation, ISSN 0096-3003, 05/2015, Volume 259, pp. 1019 - 1029

In this sequel to the recent work (see Srivastava, 2015), we investigate some further properties of a linear operator associated with Srivastava’s...

Dziok–Srivastava and Srivastava–Wright operators | Srivastava–Attiya operator | [formula omitted]-Generalized Hurwitz–Lerch zeta function | Meromorphic functions | Hadamard product (or convolution) | Analytic functions | Dziok-Srivastava and Srivastava-Wright operators | Srivastava-Attiya operator | λ-Generalized Hurwitz-Lerch zeta function

Dziok–Srivastava and Srivastava–Wright operators | Srivastava–Attiya operator | [formula omitted]-Generalized Hurwitz–Lerch zeta function | Meromorphic functions | Hadamard product (or convolution) | Analytic functions | Dziok-Srivastava and Srivastava-Wright operators | Srivastava-Attiya operator | λ-Generalized Hurwitz-Lerch zeta function

Journal Article

Applied Mathematics and Computation, ISSN 0096-3003, 04/2012, Volume 218, Issue 15, pp. 7685 - 7693

In some recent investigations involving differential operators for the generalized Lagrange polynomials, Chan et al. [W.-C.C. Chan, C.-J. Chyan, H.M....

Kampé de Fériet function | Lauricella functions | Lagrange polynomials | Erkuş–Srivastava polynomials | Srivastava–Daoust (or generalized Lauricella) functions | Appell’s functions | Chan–Chyan–Srivastava polynomials | Srivastava-Daoust (or generalized Lauricella) functions | Appell's functions | Erku-Srivastava polynomials | Chan-Chyan-Srivastava polynomials | MATHEMATICS, APPLIED | Kampe de Feriet function | VARIABLES | Erkus-Srivastava polynomials | Operators | Mathematical models | Computation | Integrals | Mathematical analysis | Transforms

Kampé de Fériet function | Lauricella functions | Lagrange polynomials | Erkuş–Srivastava polynomials | Srivastava–Daoust (or generalized Lauricella) functions | Appell’s functions | Chan–Chyan–Srivastava polynomials | Srivastava-Daoust (or generalized Lauricella) functions | Appell's functions | Erku-Srivastava polynomials | Chan-Chyan-Srivastava polynomials | MATHEMATICS, APPLIED | Kampe de Feriet function | VARIABLES | Erkus-Srivastava polynomials | Operators | Mathematical models | Computation | Integrals | Mathematical analysis | Transforms

Journal Article

Azerbaijan Journal of Mathematics, ISSN 2218-6816, 01/2018, Volume 8, Issue 1, pp. 35 - 51

Journal Article

2012, Rev. ed., ISBN 9780123852182, 675

Zeta and q-Zeta Functions and Associated Series and Integrals is a thoroughly revised, enlarged and updated version of Series Associated with the Zeta and...

Mathematics | Functions, Zeta | Series

Mathematics | Functions, Zeta | Series

eBook

Applied Mathematics and Computation, ISSN 0096-3003, 2010, Volume 217, Issue 2, pp. 918 - 928

In the present paper, we investigate some subordination- and superordination-preserving properties for certain classes of analytic and multivalent functions in...

Srivastava–Attiya operator | Integral operators | Subordination and superordination | Best dominant and best subordinant | Sandwich-type results | Analytic and multivalent functions | Srivastava-Attiya operator | SUBORDINATION | MATHEMATICS, APPLIED | PRESERVING INTEGRAL-OPERATORS | SUBCLASSES | UNIVALENT-FUNCTIONS | SUPERORDINATION | Operators | Theorems | Multipliers | Computation | Mathematical analysis | Disks | Mathematical models | Transformations

Srivastava–Attiya operator | Integral operators | Subordination and superordination | Best dominant and best subordinant | Sandwich-type results | Analytic and multivalent functions | Srivastava-Attiya operator | SUBORDINATION | MATHEMATICS, APPLIED | PRESERVING INTEGRAL-OPERATORS | SUBCLASSES | UNIVALENT-FUNCTIONS | SUPERORDINATION | Operators | Theorems | Multipliers | Computation | Mathematical analysis | Disks | Mathematical models | Transformations

Journal Article

Applied Mathematics and Computation, ISSN 0096-3003, 2004, Volume 159, Issue 2, pp. 485 - 493

The main object of the present paper is to investigate several interesting properties and characteristics of a linear operator H p, q, s ( α 1) which was...

Dziok–Srivastava operator | Hadamard product (or convolution) | Differential subordination | Analytic functions | Univalent functions | Generalized hypergeometric functions | Dziok-Srivastava operator

Dziok–Srivastava operator | Hadamard product (or convolution) | Differential subordination | Analytic functions | Univalent functions | Generalized hypergeometric functions | Dziok-Srivastava operator

Journal Article

Applied Mathematics and Computation, ISSN 0096-3003, 04/2013, Volume 219, Issue 15, pp. 8398 - 8406

Motivated essentially by the fact that generating functions play an important rôle in the investigation of many potentially useful properties of the sequences...

Carlitz’s generating functions | Srivastava–Agarwal type generating functions | q-Exponential decomposition technique | Carlitz’s q-operators | Rogers–Szegö and generalized Rogers–Szegö polynomials | Carlitz type generating functions | Hahn and generalized Hahn polynomials | Q-Exponential decomposition technique | Srivastava-Agarwal type generating | Rogers-Szegö | Functions | Generalized Rogers-Szegö polynomials | Carlitz's generating functions | Carlitz's q-operators | MATHEMATICS, APPLIED | OPERATOR IDENTITIES | Srivastava-Agarwal type generating functions | Rogers-Szego and generalized Rogers-Szego polynomials | Q-HERMITE POLYNOMIALS

Carlitz’s generating functions | Srivastava–Agarwal type generating functions | q-Exponential decomposition technique | Carlitz’s q-operators | Rogers–Szegö and generalized Rogers–Szegö polynomials | Carlitz type generating functions | Hahn and generalized Hahn polynomials | Q-Exponential decomposition technique | Srivastava-Agarwal type generating | Rogers-Szegö | Functions | Generalized Rogers-Szegö polynomials | Carlitz's generating functions | Carlitz's q-operators | MATHEMATICS, APPLIED | OPERATOR IDENTITIES | Srivastava-Agarwal type generating functions | Rogers-Szego and generalized Rogers-Szego polynomials | Q-HERMITE POLYNOMIALS

Journal Article

Complex Analysis and Operator Theory, ISSN 1661-8254, 8/2016, Volume 10, Issue 6, pp. 1267 - 1275

The purpose of this paper is to introduce new integral operators associated with Srivastava–Saigo–Owa fractional differintegral operator. We investigate some...

Operator Theory | Hadamard product or convolution | Srivastava–Saigo–Owa fractional differintegral operator | 30C45 | 30C50 | Analysis | Mathematics, general | p$$ p -Valent functions | Mathematics | p-Valent functions | MATHEMATICS | Srivastava-Saigo-Owa fractional differintegral operator | MATHEMATICS, APPLIED | SUBCLASSES | STARLIKE | UNIVALENT | FAMILY

Operator Theory | Hadamard product or convolution | Srivastava–Saigo–Owa fractional differintegral operator | 30C45 | 30C50 | Analysis | Mathematics, general | p$$ p -Valent functions | Mathematics | p-Valent functions | MATHEMATICS | Srivastava-Saigo-Owa fractional differintegral operator | MATHEMATICS, APPLIED | SUBCLASSES | STARLIKE | UNIVALENT | FAMILY

Journal Article

Applied Mathematics and Computation, ISSN 0096-3003, 2006, Volume 182, Issue 1, pp. 213 - 222

In this study, by obtaining some Korovkin type approximation results in statistical sense for certain positive linear operators constructed by means of the...

Gibbs phenomenon | Korovkin approximation theorem | Lagrange polynomials | Lipschitz class | Positive linear operators | Fourier series | Modulus of continuity | A-statistical convergence | Chan–Chyan–Srivastava multivariable polynomials | Chan-Chyan-Srivastava multivariable polynomials | lipschitz class | MATHEMATICS, APPLIED | positive linear operators | CONVERGENCE | modulus of continuity | Universities and colleges

Gibbs phenomenon | Korovkin approximation theorem | Lagrange polynomials | Lipschitz class | Positive linear operators | Fourier series | Modulus of continuity | A-statistical convergence | Chan–Chyan–Srivastava multivariable polynomials | Chan-Chyan-Srivastava multivariable polynomials | lipschitz class | MATHEMATICS, APPLIED | positive linear operators | CONVERGENCE | modulus of continuity | Universities and colleges

Journal Article

Journal of Computational Analysis and Applications, ISSN 1521-1398, 08/2020, Volume 28, Issue 4, pp. 628 - 645

Journal Article

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