The barrier cone of a convex set and the closure of the cover.
Bair, J., Dupin, J.C. (1999)
Journal of Convex Analysis
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Displaying similar documents to “Integral representations in conuclear cones.”
The barrier cone of a convex set and the closure of the cover.
Correct Soltan-Vasiloi criterion for convex cones.
Cel, Jaroslav (1999)
Beiträge zur Algebra und Geometrie
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A note on Gordan's theorem over cone domains.
Skarpness, Brad, Sposito, V.A. (1982)
International Journal of Mathematics and Mathematical Sciences
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Some characterizations of ideal points in vector optimization problems.
Chai, Yan-Fei, Cho, Yeol Je, Li, Jun (2008)
Journal of Inequalities and Applications [electronic only]
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Convex cones and convex sets
Nachbin, Leopoldo (1993)
Portugaliae mathematica
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On Tucker's key theorem.
Berman, Abraham, Tarsy, Michael (1978)
International Journal of Mathematics and Mathematical Sciences
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A generalization of Dubovitskij-Miliutin theorem
V. Averbuch (2000)
Acta Universitatis Carolinae. Mathematica et Physica
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Elements generating balayages.
Eriksson-Bique, Sirkka-Liisa (1994)
Annales Academiae Scientiarum Fennicae. Series A I. Mathematica
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Optimality conditions of globally efficient solution for vector equilibrium problems with generalized convexity.
Qiu, Qiusheng (2009)
Journal of Inequalities and Applications [electronic only]
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Numerical behavior of the method of projection onto an acute cone with level control in convex minimization
Robert Dylewski (2000)
Discussiones Mathematicae, Differential Inclusions, Control and Optimization
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We present the numerical behavior of a projection method for convex minimization problems which was studied by Cegielski [1]. The method is a modification of the Polyak subgradient projection method [6] and of variable target value subgradient method of Kim, Ahn and Cho [2]. In each iteration of the method an obtuse cone is constructed. The obtuse cone is generated by a linearly independent system of subgradients. The next approximation of a solution is the projection onto a translated...