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A review of selected topics in majorization theory

Marek Niezgoda (2013)

Banach Center Publications

In this expository paper, some recent developments in majorization theory are reviewed. Selected topics on group majorizations, group-induced cone orderings, Eaton triples, normal decomposition systems and similarly separable vectors are discussed. Special attention is devoted to majorization inequalities. A unified approach is presented for proving majorization relations for eigenvalues and singular values of matrices. Some methods based on the Chebyshev functional and similarly separable vectors...

A sandwich theorem and Hyers-Ulam stability of affine functions.

Kazimierz Nikodem, Szymon Wasowicz (1995)

Aequationes mathematicae

A sandwich with convexity.

Baron, Karol, Matkowski, Janusz, Nikodem, Kazimierz (1994)

Mathematica Pannonica

A sandwich with convexity for set-valued functions.

Sadowska, Elżbieta (1996)

Mathematica Pannonica

A separation theorem for $M_{φ}$ -convex functions.

Matkowski, Janusz, Zgraja, Tomasz (1998)

Mathematica Pannonica

A sequence of mappings connected with Jensen's inequality and applications

S. S. Dragomir, D. M. Milošević (1992)

Matematički Vesnik

A variant of Jensen's inequality.

Mercer, A.McD. (2003)

JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]

A variant of Jensen-Steffensen's inequality for convex and superquadratic functions.

Abramovich, Shoshana, Bakula, M.Klaricic, Banic, S. (2006)

JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]

Additive and convex functions in linear topological space.

Zbigniew Gajda (1984)

Aequationes mathematicae

Almost midconvex and almost convex set-valued functions

Elżbieta Sadowska (2000)

Mathematica Slovaca

Almost $λ$ -convex and almost Wright-convex functions

Mirosław Adamek (2003)

Mathematica Slovaca

An even easier proof of monotonicity of Stolarsky means

Alfred Witkowski (2011)

Kragujevac Journal of Mathematics

An extension of Chebyshev's inequality and its connection with Jensen's inequality.

Niculescu, Constantin P. (2001)

Journal of Inequalities and Applications [electronic only]

An extension of results of A. McD. Mercer and I. Gavrea.

Niezgoda, Marek (2005)

JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]

An extension of Stolarsky means.

Simić, Slavko (2008)

Novi Sad Journal of Mathematics

An imbedding theorem for H°(G,Ω)-spaces

Neil Trudinger (1974)

Studia Mathematica

An inequality for m-convex sequences

J. E. Pečarić (1981)

Matematički Vesnik

Analyse de récession et résultats de stabilité d’une convergence variationnelle, application à la théorie de la dualité en programmation mathématique

Driss Mentagui (2003)

ESAIM: Control, Optimisation and Calculus of Variations

Soit $X$ un espace de Banach de dual topologique $X^{'}$ . $𝒞 (X)$ (resp. $𝒞 (X^{'})$ ) désigne l’ensemble des parties non vides convexes fermées de $X$ (resp. $w^{*}$ -fermées de $X^{'}$ ) muni de la topologie de la convergence uniforme sur les bornés des fonctions distances. Cette topologie se réduit à celle de la métrique de Hausdorff sur les convexes fermés bornés [16] et admet en général une représentation en terme de cette dernière [11]. De plus, la métrique qui lui est associée s’est révélée très adéquate pour l’étude quantitative...

Analyse de récession et résultats de stabilité d'une convergence variationnelle, application à la théorie de la dualité en programmation mathématique

Driss Mentagui (2010)

ESAIM: Control, Optimisation and Calculus of Variations

Let X be a Banach space and X' its continuous dual. C(X) (resp. C(X')) denotes the set of nonempty convex closed subsets of X (resp. ω*-closed subsets of X') endowed with the topology of uniform convergence of distance functions on bounded sets. This topology reduces to the Hausdorff metric topology on the closed and bounded convex sets [16] and in general has a Hausdorff-like presentation [11]. Moreover, this topology is well suited for estimations and constructive approximations [6-9]. We...

Analytische Eigenschaften konvexer Funktionen auf Riemannschen Mannigfaltigkeiten.

Victor Bangert (1979)

Journal für die reine und angewandte Mathematik

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