Articoli correlati a Probability Theory and Combinatorial Optimization
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An introduction to the state of the art of the probability theory most applicable to combinatorial optimization.
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Descrizione del libro
An introduction to the state of the art of the probability theory most applicable to combinatorial optimization. The questions that receive the most attention are those that deal with discrete optimization problems for points in Euclidean space, such as the minimum spanning tree, the traveling-salesman tour, and minimal-length matchings.
Contenuti
Preface; 1. First View of Problems and Methods. A first example. Long common subsequences; Subadditivity and expected values; Azuma's inequality and a first application; A second example. The increasing-subsequence problem; Flipping Azuma's inequality; Concentration on rates; Dynamic programming; Kingman's subadditive ergodic theorem; Observations on subadditive subsequences; Additional notes; 2. Concentration of Measure and the Classical Theorems. The TSP and quick application of Azuma's inequality; Easy size bounds; Another mean Poissonization; The Beardwood-Halton-Hammersly theorem; Karp's partitioning algorithms; Introduction to space-filling curve heuristic; Asymptotics for the space-filling curve heuristic; Additional notes; 3. More General Methods. Subadditive Euclidean functionals; Examples. Good, bad and forthcoming; A general L-(infinity) bound; Simple subadditivity and geometric subadditivity; A concentration inequality; Minimal matching; Two-sided bounds and first consequences; Rooted duals and their applications; Lower bounds and best possibilities; Additional remarks; 4. Probability in Greedy Algorithms and Linear Programming. Assignment problem; Simplex method for theoreticians; Dyer-Frieze-McDiarmid inequality; Dealing with integral constraints; Distributional bounds; Back to the future; Additional remarks; 5. Distributional Techniques and the Objective Method. Motivation for a method; Searching for a candidate object; Topology for nice sets; Information on the infinite tree; Dénoument; Central limit theory; Conditioning method for independence; Dependency graphs and the CLT; Additional remarks; 6. Talagrand's Isoperimetric Theory. Talagrand's isoperimetric theory; Two geometric applications of the isoperimetric inequality; Application to the longest-increasing-subsequence problem; Proof of the isoperimetric problem; Application and comparison in the theory of hereditary sets; Suprema of linear functionals; Tail of the assignment problem; Further applications of Talagrand's isoperimetric inequalities; Final considerations on related work; Bibliography; Index.
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Probability Theory and Combinatorial Optimization
Editore:
Society for Industrial & Applied Mathematics,U.S., 1987
ISBN 10: 0898713803
ISBN 13: 9780898713800
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Probability Theory and Combinatorial Optimization
Editore:
Society For Industrial And Applied Mathematics, 1997
ISBN 10: 0898713803
ISBN 13: 9780898713800
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Condizione: Good. This is an ex-library book and may have the usual library/used-book markings inside.This book has soft covers. Clean from markings. In good all round condition. Please note the Image in this listing is a stock photo and may not match the covers of the actual item,400grams, ISBN:0898713803. Codice articolo 9866358
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Foto dell'editore
Probability Theory and Combinatorial Optimization
Editore:
Society for Industrial & Applied, 1997
ISBN 10: 0898713803
ISBN 13: 9780898713800
Nuovo
Paperback
Da: Revaluation Books, Exeter, Regno Unito
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Paperback. Condizione: Brand New. illustrated edition. 167 pages. 10.00x7.00x0.50 inches. In Stock. Codice articolo __0898713803
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