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Displaying 161 – 178 of 178

Strongly quasiconvex quadratic functions.

Jovanović, Milan V. (1993)

Publications de l'Institut Mathématique. Nouvelle Série

Structural properties of singularities of semiconcave functions

Paolo Albano, Piermarco Cannarsa (1999)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

The calculus of operator functions and operator convexity [Book]

A. L. Brown, H. L. Vasudeva (2000)

The distance between subdifferentials in the terms of functions

Libor Veselý (1993)

Commentationes Mathematicae Universitatis Carolinae

For convex continuous functions $f, g$ defined respectively in neighborhoods of points $x, y$ in a normed linear space, a formula for the distance between $\partial f (x)$ and $\partial g (y)$ in terms of $f, g$ (i.eẇithout using the dual) is proved. Some corollaries, like a new characterization of the subdifferential of a continuous convex function at a point, are given. This, together with a theorem from [4], implies a sufficient condition for a family of continuous convex functions on a barrelled normed linear space to be locally uniformly...

The Schur-harmonic-convexity of dual form of the Hamy symmetric function

Junxia Meng, Yuming Chu, Xiaomin Tang (2010)

Matematički Vesnik

The sum of two plane convex C... sets is not always C...

Jan Boman (1990)

Mathematica Scandinavica

The use of conjugate convex functions in complex analysis

Christer Kieselman (1983)

Banach Center Publications

Transformations which preserve convexity.

Fontenot, Robert A., Proschan, Frank (1985)

International Journal of Mathematics and Mathematical Sciences

Two new mappings associated with inequalities of Hadamard-type for convex functions.

He, Lan (2009)

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

Une famille d’inégalités pour les ensembles convexes du plan

Michel Crouzeix (2005)

Annales mathématiques Blaise Pascal

Nous considérons une famille de fonctions ne dépendant que de la forme d’un ensemble convexe du plan. Nous en donnons des majorations faisant intervenir le plus petit rapport des rayons des couronnes qui contiennent la frontière de ce convexe.

Weighted multidimensional inequalities for monotone functions

Sorina Barza, Lars-Erik Persson (1999)

Mathematica Bohemica

We discuss the characterization of the inequality (RN+ fq u)1/q C (RN+ fp v )1/p, 0<q, p <, for monotone functions $f \geq 0$ and nonnegative weights $u$ and $v$ and $N \geq 1$ . We prove a new multidimensional integral modular inequality for monotone functions. This inequality generalizes and unifies some recent results in one and several dimensions.

Currently displaying 161 – 178 of 178

Previous Page 9

Displaying 161 – 178 of 178

Strongly quasiconvex quadratic functions.

Structural properties of singularities of semiconcave functions

The calculus of operator functions and operator convexity [Book]

The distance between subdifferentials in the terms of functions

The Schur-harmonic-convexity of dual form of the Hamy symmetric function

The sum of two plane convex C... sets is not always C...

The use of conjugate convex functions in complex analysis

Transformations which preserve convexity.

Two new mappings associated with inequalities of Hadamard-type for convex functions.

Une famille d’inégalités pour les ensembles convexes du plan

Weighted multidimensional inequalities for monotone functions

Well behaved asymptotical convex functions

Whitney covers and quasi-isometry of $L^{s} (μ)$ -averaging domains.

О критерии выпуклости положительно однородной функции

О производных по направлениям квазивыпуклых функционалов

Опыт решения модельных задач минимизации $ε$ -субградиентным методом

Субградиентный метод отыскания седловой точки выпукло-вогнутой функции

Экстремальные выпуклые функции.

Currently displaying 161 – 178 of 178