Journal of Mathematical Analysis and Applications, ISSN 0022-247X, 06/2013, Volume 402, Issue 1, pp. 127 - 132

We improve the operator Kantorovich inequality as follows: Let A be a positive operator on a Hilbert space with 0 Schwarz inequality | Choi’s inequality | Kantorovich inequality | Operator inequalities | Wielandt inequality | Positive linear maps | Choi's inequality | MATHEMATICS | MATHEMATICS, APPLIED

Journal Article

JOURNAL OF MATHEMATICAL INEQUALITIES, ISSN 1846-579X, 12/2018, Volume 12, Issue 4, pp. 1075 - 1085

We give the Choi-Davis-Jensen type inequality without using convexity. Applying our main results, we also give new inequalities improving previous known...

MATHEMATICS | Kantormich inequality | MATHEMATICS, APPLIED | POSITIVE LINEAR-MAPS | positive linear maps | operator inequality | convex function | Choi-Davis-Jensen's inequality

MATHEMATICS | Kantormich inequality | MATHEMATICS, APPLIED | POSITIVE LINEAR-MAPS | positive linear maps | operator inequality | convex function | Choi-Davis-Jensen's inequality

Journal Article

Linear Algebra and Its Applications, ISSN 0024-3795, 11/2018, Volume 557, pp. 375 - 402

In this paper, we investigate the question of when the equations A⁎sAs=(A⁎A)s, s∈S, where S is a finite set of positive integers, imply the quasinormality or...

Normal operator | Operator equation | Davis–Choi–Jensen inequality | Operator inequality | Weighted shift | Operator convex function | Quasinormal operator | MATHEMATICS, APPLIED | Davis-Choi-Jensen inequality | DIRECTED TREE | POWERS | MATHEMATICS | WEIGHTED SHIFTS | EQUALITY | JENSEN INEQUALITY | UNBOUNDED COMPOSITION OPERATORS

Normal operator | Operator equation | Davis–Choi–Jensen inequality | Operator inequality | Weighted shift | Operator convex function | Quasinormal operator | MATHEMATICS, APPLIED | Davis-Choi-Jensen inequality | DIRECTED TREE | POWERS | MATHEMATICS | WEIGHTED SHIFTS | EQUALITY | JENSEN INEQUALITY | UNBOUNDED COMPOSITION OPERATORS

Journal Article

Georgian Mathematical Journal, ISSN 1072-947X, 03/2018, Volume 25, Issue 1, pp. 93 - 107

The aim of this paper is to present a comprehensive study of operator -convex functions. Let , and for some or . A continuous function is called operator...

26A51 | Jensen operator functional | Jensen–Mercer inequality | 46L05 | 47A64 | Jensen inequality | Choi–Davis–Jensen inequality | 47A63 | MATHEMATICS | JENSENS INEQUALITY | REFINEMENTS | Jensen-Mercer inequality | MERCERS TYPE | operator m-convex | Choi-Davis-Jensen inequality

26A51 | Jensen operator functional | Jensen–Mercer inequality | 46L05 | 47A64 | Jensen inequality | Choi–Davis–Jensen inequality | 47A63 | MATHEMATICS | JENSENS INEQUALITY | REFINEMENTS | Jensen-Mercer inequality | MERCERS TYPE | operator m-convex | Choi-Davis-Jensen inequality

Journal Article

Journal of Mathematical Inequalities, ISSN 1846-579X, 09/2012, Volume 6, Issue 3, pp. 473 - 480

The classical Jensen inequality is expressed by internally dividing points and so is non-commutative Jensen inequalities. In this paper, considering that it is...

Operator concave | Reverse inequality | Davis-Choi-Jensen inequality | Jensen inequality | MATHEMATICS | MATHEMATICS, APPLIED | OPERATOR-INEQUALITY | reverse inequality

Operator concave | Reverse inequality | Davis-Choi-Jensen inequality | Jensen inequality | MATHEMATICS | MATHEMATICS, APPLIED | OPERATOR-INEQUALITY | reverse inequality

Journal Article

Electronic Journal of Linear Algebra, ISSN 1537-9582, 2013, Volume 26, pp. 406 - 416

In this paper, some extensions of recent results on Choi-Davis-Jensen's inequality due to Khosravi et al. [M. Khosravi, J.S. Aujla, S.S. Dragomir, and M.S....

Positive linear map | Unital C-algebra | Choi-Davis-Jensen's inequality | Operator convex/concave function | Generalized inverse | MATHEMATICS | ALGEBRAS

Positive linear map | Unital C-algebra | Choi-Davis-Jensen's inequality | Operator convex/concave function | Generalized inverse | MATHEMATICS | ALGEBRAS

Journal Article

Linear Algebra and Its Applications, ISSN 0024-3795, 01/2011, Volume 434, Issue 1, pp. 14 - 17

We show an inequality for unital positive linear maps Φ interpolating Choi’s inequality (p=0) with a recent result of Bourin and Ricard...

Choi inequality | Order preserving operator inequality | Kadison inequality | Unital positive linear map | MATHEMATICS, APPLIED

Choi inequality | Order preserving operator inequality | Kadison inequality | Unital positive linear map | MATHEMATICS, APPLIED

Journal Article

Journal of Mathematical Analysis and Applications, ISSN 0022-247X, 05/2017, Volume 449, Issue 2, pp. 1472 - 1478

Let a linear map Φ between two unital C⁎-algebras be positive and unital. Kadison showed that if f(t)=|t| and Φ(f(X))=f(Φ(X)) for all selfadjoint operators X,...

Positive linear map | [formula omitted]-homomorphism | Rigid function | Operator convex function | Davis and Choi's inequality | Distribution | homomorphism | MATHEMATICS | MATHEMATICS, APPLIED | OPERATOR | MAJORIZATION | JENSEN INEQUALITY | C-homomorphism

Positive linear map | [formula omitted]-homomorphism | Rigid function | Operator convex function | Davis and Choi's inequality | Distribution | homomorphism | MATHEMATICS | MATHEMATICS, APPLIED | OPERATOR | MAJORIZATION | JENSEN INEQUALITY | C-homomorphism

Journal Article

Mathematical Inequalities and Applications, ISSN 1331-4343, 01/2015, Volume 18, Issue 1, pp. 169 - 184

In this paper, we study jointly subadditive mappings induced by operator convex functions and generalized inverses of positive linear maps. We formulate...

Positive linear map | Operator convex function | Choi-Davis-Jensen's inequality | Operator jensen inequality | Generalized inverse | Sub-/superadditive mapping | POSITIVE LINEAR-MAPS | ADJOINTABLE OPERATORS | C-ASTERISK-MODULES | INEQUALITY | positive linear map | GENERALIZED INVERSES | MATHEMATICS | ALGEBRAS | operator Jensen inequality | generalized inverse | sub-/superadditive mapping | SPECTRA

Positive linear map | Operator convex function | Choi-Davis-Jensen's inequality | Operator jensen inequality | Generalized inverse | Sub-/superadditive mapping | POSITIVE LINEAR-MAPS | ADJOINTABLE OPERATORS | C-ASTERISK-MODULES | INEQUALITY | positive linear map | GENERALIZED INVERSES | MATHEMATICS | ALGEBRAS | operator Jensen inequality | generalized inverse | sub-/superadditive mapping | SPECTRA

Journal Article

Electronic Journal of Linear Algebra, ISSN 1537-9582, 03/2013, Volume 26, pp. 192 - 200

Let Phi and Psi be unital positive linear maps satisfying some conditions with respect to positive scalars alpha and beta. It is shown that if a real valued...

Positive linear map | Davis-Choi-Jensen inequality | Operator concave function | MATHEMATICS | INEQUALITY

Positive linear map | Davis-Choi-Jensen inequality | Operator concave function | MATHEMATICS | INEQUALITY

Journal Article

Applicable Analysis and Discrete Mathematics, ISSN 1452-8630, 10/2018, Volume 12, Issue 2, pp. 493 - 507

For fixed real > 1 and α > 0, let . Abel proved that , and gave an explicit formula for determining the coefficients ( ,α) in terms of Stirling numbers of the...

Eulers constant | Mathematical integrals | Mathematical constants | Mathematical functions | Mathematical inequalities | Gamma function | Coefficients | Recurrence relations | Number theory | Barnes G-function | Asymptotic expansion | Somos' quadratic recurrence constant | Choi-Srivastava constants | Glaisher-Kinkelin constant | GAMMA | MATHEMATICS, APPLIED | SERIES | INEQUALITIES | REPRESENTATIONS | DETERMINANTS | MATHEMATICS | ZETA-FUNCTION | MONOTONICITY PROPERTIES | REMAINDER | GLAISHER-KINKELIN | LOGARITHM

Eulers constant | Mathematical integrals | Mathematical constants | Mathematical functions | Mathematical inequalities | Gamma function | Coefficients | Recurrence relations | Number theory | Barnes G-function | Asymptotic expansion | Somos' quadratic recurrence constant | Choi-Srivastava constants | Glaisher-Kinkelin constant | GAMMA | MATHEMATICS, APPLIED | SERIES | INEQUALITIES | REPRESENTATIONS | DETERMINANTS | MATHEMATICS | ZETA-FUNCTION | MONOTONICITY PROPERTIES | REMAINDER | GLAISHER-KINKELIN | LOGARITHM

Journal Article

12.
Full Text
Unified treatment of several asymptotic expansions concerning some mathematical constants

Applied Mathematics and Computation, ISSN 0096-3003, 07/2017, Volume 305, pp. 348 - 363

Recently various approximation formulas for some mathematical constants have been investigated and presented by many authors. In this paper, we first find that...

Euler–Mascheroni constant | Asymptotic expansion | Choi–Srivastava constants | Glaisher–Kinkelin constant | Constants of Landau and Lebesgue | MATHEMATICS, APPLIED | INEQUALITIES | LANDAU CONSTANTS | DETERMINANTS | PSI | Glaisher-Kinkelin constant | Euler-Mascheroni constant | ZETA-FUNCTION | BOUNDS | Choi-Srivastava constants | GLAISHER-KINKELIN | CONVERGENCE | LEBESGUE | FORMULAS

Euler–Mascheroni constant | Asymptotic expansion | Choi–Srivastava constants | Glaisher–Kinkelin constant | Constants of Landau and Lebesgue | MATHEMATICS, APPLIED | INEQUALITIES | LANDAU CONSTANTS | DETERMINANTS | PSI | Glaisher-Kinkelin constant | Euler-Mascheroni constant | ZETA-FUNCTION | BOUNDS | Choi-Srivastava constants | GLAISHER-KINKELIN | CONVERGENCE | LEBESGUE | FORMULAS

Journal Article

数理解析研究所講究録, ISSN 1880-2818, 04/2011, Volume 1737, pp. 35 - 39

Journal Article

Journal of Inequalities and Applications, ISSN 1025-5834, 12/2013, Volume 2013, Issue 1, pp. 1 - 10

The purpose of the present paper is to investigate some inclusion properties of certain classes of analytic functions associated with a family of linear...

linear operator | Ruscheweyh derivative operator | convex function | Mathematics | starlike function | Hadamard product (or convolution) | Analysis | close-to-convex function | Mathematics, general | Applications of Mathematics | Choi-Saigo-Srivastava operator | subordination | Carlson-Shaffer operator | Subordination | Close-to-convex function | Convex function | Starlike function | Linear operator | STARLIKE FUNCTIONS | MATHEMATICS, APPLIED | HYPERGEOMETRIC-FUNCTIONS | MATHEMATICS | INTEGRAL OPERATOR | HADAMARD-PRODUCTS | Operators | Convolution | Analytic functions | Inequalities | Inclusions | Linear operators | Invariants

linear operator | Ruscheweyh derivative operator | convex function | Mathematics | starlike function | Hadamard product (or convolution) | Analysis | close-to-convex function | Mathematics, general | Applications of Mathematics | Choi-Saigo-Srivastava operator | subordination | Carlson-Shaffer operator | Subordination | Close-to-convex function | Convex function | Starlike function | Linear operator | STARLIKE FUNCTIONS | MATHEMATICS, APPLIED | HYPERGEOMETRIC-FUNCTIONS | MATHEMATICS | INTEGRAL OPERATOR | HADAMARD-PRODUCTS | Operators | Convolution | Analytic functions | Inequalities | Inclusions | Linear operators | Invariants

Journal Article

New York Times (Online), 10/2019

Bong Joon Ho’s latest film joins a growing list of movies criticizing South Korean inequality — a problem so pervasive it has given birth to its own slang.

Sting operations | Income distribution | Income inequality | Moon Jae-in | Slang | Asian studies | Choi Soon-sil | Impeachment | Parks & recreation areas | Cho Kuk | Bong Joon-ho

Sting operations | Income distribution | Income inequality | Moon Jae-in | Slang | Asian studies | Choi Soon-sil | Impeachment | Parks & recreation areas | Cho Kuk | Bong Joon-ho

Newspaper Article

Communications in Nonlinear Science and Numerical Simulation, ISSN 1007-5704, 03/2020, Volume 82, p. 105025

•Introduce linear canonical transform free parameters into Choi–Williams distribution.•Output SNR improvement’s mathematical model: an output SNR...

Linear canonical transform | Choi–Williams distribution | Linear frequency-modulated signal | Linear canonical Choi-Williams distribution | SYSTEM | TARGET | MATRIX | MATHEMATICS, APPLIED | DESIGN | PHYSICS, FLUIDS & PLASMAS | RECONSTRUCTION | TERMS | PHYSICS, MATHEMATICAL | CONVOLUTION | Choi-Williams distribution | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | MECHANICS | UNCERTAINTY PRINCIPLES | TRANSFORM | WIGNER DISTRIBUTION

Linear canonical transform | Choi–Williams distribution | Linear frequency-modulated signal | Linear canonical Choi-Williams distribution | SYSTEM | TARGET | MATRIX | MATHEMATICS, APPLIED | DESIGN | PHYSICS, FLUIDS & PLASMAS | RECONSTRUCTION | TERMS | PHYSICS, MATHEMATICAL | CONVOLUTION | Choi-Williams distribution | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | MECHANICS | UNCERTAINTY PRINCIPLES | TRANSFORM | WIGNER DISTRIBUTION

Journal Article

FILOMAT, ISSN 0354-5180, 2019, Volume 33, Issue 4, pp. 1209 - 1215

For Legendrian submanifolds M-n in Sasakian space forms (M) over tilde (2n+1)(c), I. Mihai obtained an inequality relating the normalised scalar curvature...

MATHEMATICS | MATHEMATICS, APPLIED | SYMMETRIES | generalised Wintgen ideal Legendrian submanifold | Legendrian submanifold in Sasakian space forms | Ricci pseudosymmetric space | DDVV CONJECTURE | manifold with pseudosymmetric Weyl conformal tensor | Choi-Lu plane of the generalised Wintgen ideal Legendrian submanifold | CURVATURE | pseudosymmetric space

MATHEMATICS | MATHEMATICS, APPLIED | SYMMETRIES | generalised Wintgen ideal Legendrian submanifold | Legendrian submanifold in Sasakian space forms | Ricci pseudosymmetric space | DDVV CONJECTURE | manifold with pseudosymmetric Weyl conformal tensor | Choi-Lu plane of the generalised Wintgen ideal Legendrian submanifold | CURVATURE | pseudosymmetric space

Journal Article

09/2018, ISBN 9781138290235, 374

The Routledge Companion to the Suburbs provides one of the most comprehensive examinations available to date of the suburbs around the world. International in...

Jon C. Teaford | Anjuli N. Fahlberg | Bill Randolph | Chang Gyu Choi | Ferguson | Handbooks | Public Administration & Management | Dan Zinder | David Ekholm | Andrew Gorman-Murray | Bahar Durmaz-Drinkwater | Urban Geography | John Rennie Short | Fikri Zul Fahmi | Urban Studies | Juliet Carpenter | Colin Polsky | Alison L. Bain | Cody R. Price | Deden Rukmana | Catherine J. Nash | Ann Forsyth | Annapurna Shaw | banlieue | Erina Iwasaki | gaybourhood | Alex Schafran | Asli Ceylan Öner | Jaap Vos | Justin B. Hollander | Cairo | Jakarta | Planning | Australia | Dan Runfola | Suburban life | Suburbs

Jon C. Teaford | Anjuli N. Fahlberg | Bill Randolph | Chang Gyu Choi | Ferguson | Handbooks | Public Administration & Management | Dan Zinder | David Ekholm | Andrew Gorman-Murray | Bahar Durmaz-Drinkwater | Urban Geography | John Rennie Short | Fikri Zul Fahmi | Urban Studies | Juliet Carpenter | Colin Polsky | Alison L. Bain | Cody R. Price | Deden Rukmana | Catherine J. Nash | Ann Forsyth | Annapurna Shaw | banlieue | Erina Iwasaki | gaybourhood | Alex Schafran | Asli Ceylan Öner | Jaap Vos | Justin B. Hollander | Cairo | Jakarta | Planning | Australia | Dan Runfola | Suburban life | Suburbs

eBook

Applied Mathematics and Computation, ISSN 0096-3003, 2005, Volume 165, Issue 3, pp. 613 - 621

Let A be the class of the normalized analytic functions in the unit disk U , and K ( α ) denote the subclass of A consisting of the convex functions of order α...

Hypergeometric function | Distortion theorems | Convex functions | Analytic functions | Choi–Saigo–Srivastava integral operator | Univalent functions | Choi-Saigo-Srivastava integral operator | analytic functions | MATHEMATICS, APPLIED | distortion theorems | convex functions | univalent functions | hypergeometric function

Hypergeometric function | Distortion theorems | Convex functions | Analytic functions | Choi–Saigo–Srivastava integral operator | Univalent functions | Choi-Saigo-Srivastava integral operator | analytic functions | MATHEMATICS, APPLIED | distortion theorems | convex functions | univalent functions | hypergeometric function

Journal Article

09/2017, Routledge International Handbooks, ISBN 9781138857827, 647

Cultural policy intersects with political, economic, and socio-cultural dynamics at all levels of society, placing high and often contradictory expectations on...

Abiodun Salawu | Catherine Strong | Bridget Conor | Hui-Ju Tsai | Arts Administration | Ali Akbar Tajmazinani | Cultural Value | Dave O'Brien | John Tebbutt | Cultural Analysis | Graham Murdock | NonProfit Management | Beatriz Garcia | Jeremy Valentine | Jennifer L. Novak-Leonard | David Wright | Public Policy | Jade L. Miller | Eun-Kyoung Choi | Gooyong Kim | Devin Beauregard | Heritage Policy | Creative and Cultural Industries | George Yúdice | Amy Camilleri-Zahra | Arts Policy | Javier J. Hernez Acosta | Enrique Uribe-Jongbloed | Antonios Vlassis | Carla Figueira | Bethany Waterhouse-Bradley | Arts Management | Anne-Marie Callus

Abiodun Salawu | Catherine Strong | Bridget Conor | Hui-Ju Tsai | Arts Administration | Ali Akbar Tajmazinani | Cultural Value | Dave O'Brien | John Tebbutt | Cultural Analysis | Graham Murdock | NonProfit Management | Beatriz Garcia | Jeremy Valentine | Jennifer L. Novak-Leonard | David Wright | Public Policy | Jade L. Miller | Eun-Kyoung Choi | Gooyong Kim | Devin Beauregard | Heritage Policy | Creative and Cultural Industries | George Yúdice | Amy Camilleri-Zahra | Arts Policy | Javier J. Hernez Acosta | Enrique Uribe-Jongbloed | Antonios Vlassis | Carla Figueira | Bethany Waterhouse-Bradley | Arts Management | Anne-Marie Callus

eBook

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