Random Costs in Combinatorial Optimization

B. Derrida; C. H. Papadimitriou; C. Papadimitriou; D. Gross; D. S. Johnson; F. Ferreira; F. Ferreira; I. P. Gent; I. P. Gent; J. Galambos; J.-P. Bouchaud; M. Mézard; M. R. Garey; N. Karmarkar; P. Cheeseman; R. E. Korf; R. E. Korf; R. Monasson; S. Mertens; Stephan Mertens; T. H. Cormen; W. Ruml; Y. Fu

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Random Costs in Combinatorial Optimization

Authors: B. Derrida
C. H. Papadimitriou
C. Papadimitriou
D. Gross
D. S. Johnson
F. Ferreira
F. Ferreira
I. P. Gent
I. P. Gent
J. Galambos
J.-P. Bouchaud
M. Mézard
M. R. Garey
N. Karmarkar
P. Cheeseman
R. E. Korf
R. E. Korf
R. Monasson
S. Mertens
Stephan Mertens
T. H. Cormen
W. Ruml
Y. Fu
Publication date: 10 November 1999
Publisher: 'American Physical Society (APS)'
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Abstract

The random cost problem is the problem of finding the minimum in an exponentially long list of random numbers. By definition, this problem cannot be solved faster than by exhaustive search. It is shown that a classical NP-hard optimization problem, number partitioning, is essentially equivalent to the random cost problem. This explains the bad performance of heuristic approaches to the number partitioning problem and allows us to calculate the probability distributions of the optimum and sub-optimum costs.Comment: 4 pages, Revtex, 2 figures (eps), submitted to PR

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