Minimax and Applications: 4 - Rilegato

 
9780792336150: Minimax and Applications: 4
Rilegato
ISBN 10: 0792336151 ISBN 13: 9780792336150
Casa editrice: SPRINGER NATURE, 1995

Sinossi

Techniques and principles of minimax theory play a key role in many areas of research, including game theory, optimization, and computational complexity. In general, a minimax problem can be formulated as min max f(x, y) (1) ",EX !lEY where f(x, y) is a function defined on the product of X and Y spaces. There are two basic issues regarding minimax problems: The first issue concerns the establishment of sufficient and necessary conditions for equality minmaxf(x,y) = maxminf(x,y). (2) "'EX !lEY !lEY "'EX The classical minimax theorem of von Neumann is a result of this type. Duality theory in linear and convex quadratic programming interprets minimax theory in a different way. The second issue concerns the establishment of sufficient and necessary conditions for values of the variables x and y that achieve the global minimax function value f(x*, y*) = minmaxf(x, y). (3) "'EX !lEY There are two developments in minimax theory that we would like to mention.

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Recensione

` ... a valuable book carefully written in a clear and concise fashion. The survey papers give coherent and inspiring accounts ... coverage of algorithmic and applied topics ... is impressive. Both graduate students and researchers in fields such as optimization, computer science, production management, operations research and related areas will find this book to be an excellent source for learning about both classic and more recent developments in minimax and its applications. The editors are to be commended for their work in gathering these papers together.'
Journal of Global Optimization, 11 (1997)

Contenuti

Preface. Minimax theorems and their proofs; S. Simons. A survey on minimax trees and associated algorithms; C.G. Diderich, M. Gengler. An iterative method for the minimax problem; L. Qi, W. Sun. A dual and interior point approach to solve convex min-max problems; J.F. Sturm, S. Zhang. Determining the performance ratio of algorithm MULTIFIT for scheduling; F. Cao. A study of on-line scheduling two-stage shops; B. Chen, G.J. Woeginger. Maximin formulation of the apportionment of seats to parliament; T. Helgason, et al. On shortest k-edge connected Steiner networks with rectilinear distance; D.F. Hsu, et al. Mutually repellant sampling; S.-H. Teng. Geometry and local optimality conditions for bilevel programs with quadratic strictly convex lower levels; L.N. Vicente, P.H. Calamai. On the spherical one-center problem; G. Xue, S. Sun. On min-max optimization of a collection of classical discrete optimization problems; G. Xu, P. Kouvelis. Heilbronn problem for six points in a planar convex body; A.W.M. Dress, et al. Heilbronn problem for seven points in a planar convex body; L. Yang, Z. Zeng. On the complexity of min-max optimization problems and their approximation; K.-I Ko, C.L. Lin. A competitive algorithm for the counterfeit coin problem; X.-D. Hu, F.K. Hwang. A minimax alphabeta relaxation for global optimization; J. Gu. Minimax problems in combinatorial optimization; F. Cao, et al. Author index.

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Editore
SPRINGER NATURE
Data di pubblicazione
1995
Lingua
Inglese
ISBN 10 
0792336151
ISBN 13 
9780792336150
Rilegatura
Copertina rigida
Numero di pagine
296
Redattore
Ding-Zhu Du, Pardalos Panos M.
Contatto del produttore
non disponibile
Persona responsabile
ProductSafety@springernature.com
ProductSafety@springernature.com

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Altre edizioni note dello stesso titolo

9781461335597: Minimax and Applications: 4

Edizione in evidenza

ISBN 10:  1461335590 ISBN 13:  9781461335597
Casa editrice: Springer, 2011
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