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Generalized Convexity: Proceedings of the IVth International Workshop on Generalized Convexity Held at Janus Pannonius University Pécs, Hungary, August 31–September 2, 1992 de Sandor Komlosi

Generalized Convexity: Proceedings of the IVth International Workshop on Generalized Convexity Held at Janus Pannonius University Pécs, Hungary, August 31–September 2, 1992: Lecture Notes in Economics and Mathematical Systems, cartea 405

Editat de Sandor Komlosi, Tamas Rapcsak, Siegfried Schaible
en Limba Engleză Paperback – 28 mar 1994
Generalizations of the classical concept of a convexfunction have been proposed in various fields such aseconomics, management science, engineering, statistics andapplied sciences during the second half of this century. Inaddition to new results in more established areas ofgeneralized convexity, this book presents several importantdevelopments in recently emerging areas. Also, a number ofinteresting applications are reported.
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Specificații

ISBN-13: 9783540576242
ISBN-10: 354057624X
Pagini: 420
Ilustrații: VIII, 404 p.
Dimensiuni: 155 x 235 x 22 mm
Greutate: 0.59 kg
Ediția:Softcover reprint of the original 1st ed. 1994
Editura: Springer Berlin, Heidelberg
Colecția Springer
Seria Lecture Notes in Economics and Mathematical Systems

Locul publicării:Berlin, Heidelberg, Germany

Public țintă

Research

Cuprins

I. Generalized convex functions.- Univex sets, functions and univex nonlinear programming.- Optimization on closely convex sets.- A note on ordinal concavity.- Generalized concavity in cooperative game theory: characterizations in terms of the core.- On the existence of Nash-equilibrium in n-person generalized concave games.- A deep cut ellipsoid algorithm and quasiconvex programming.- Quasiconvexity and related properties in the calculus of variations.- Ray-quasiconvex and f-quasiconvex functions.- Geodesic convexity on ?n.- A class of differentiable generalized convex functions.- Equivalence between generalized gradients and subdifferentials (lower semigradients) for a suitable class of lower semicontinuous functions.- II. Optimality and duality.- Generalizing convexity for second order optimality conditions.- Regularity conditions for constrained extremum problems via image space approach: the linear case.- Duality theory for convex/quasiconvex functions and its application to optimization.- First order generalized optimality conditions for programming problems with a set constraint.- Abstract nonsmooth nonconvex programming.- A survey on optimality and duality in nonsmooth programming.- III. Generalized monotone maps.- Generalized monotonicity — a survey.- Orderings, generalized convexity and monotonicity.- Generalized monotonicity in non-smooth analysis.- Some invariance properties of generalized monotonicity.- IV. Fractional programming.- On quasiconvexity in fractional programming.- A class of non-linear programs: theoretical and algorithmical results.- Post-buckling analysis of frames by a hybrid path-following method.- Fractional programming under uncertainty.- V. Multiobjective programming.- Generalized concavity and optimality conditions in vector andscalar optimization.- Duality for vector valued B-invex programming.- A cutting plane algorithm for linear optimization over the efficient set.- Multiobjective scheduling problems.- On the relationships between bicriteria problems and non-linear programming.- Contributing authors.