Gérard Plateau scite author profile

First, this paper deals with lagrangean heuristics for the 0-1 bidimensional knapsack problem. A projected subgradient algorithm is performed for solving a lagrangean dual of the problem, to improve the convergence of the classical subgradient algorithm. Secondly, a local search is introduced to improve the lower bound on the value of the biknapsack produced by lagrangean heuristics. Thirdly, a variable fixing phase is embedded in the process. Finally, the sequence of 0-1 one-dimensional knapsack instances obtained from the algorithm are solved by using reoptimization techniques in order to reduce the total computational time effort. Computational results are presented.

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An efficient hybrid heuristic method for the 0-1 exact k-item quadratic knapsack problem

Létocart

Plateau²,

Plateau

2014

Pesqui. Oper.

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ABSTRACT. The 0-1 exact k-item quadratic knapsack problem (E − k QK P) consists of maximizing a quadratic function subject to two linear constraints: the first one is the classical linear capacity constraint; the second one is an equality cardinality constraint on the number of items in the knapsack. Most instances of this NP-hard problem with more than forty variables cannot be solved within one hour by a commercial software such as CPLEX 12.1. We propose therefore a fast and efficient heuristic method which produces both good lower and upper bounds on the value of the problem in reasonable time. Specifically, it integrates a primal heuristic and a semidefinite programming reduction phase within a surrogate dual heuristic. A large computational experiments over randomly generated instances with up to 200 variables validates the relevance of the bounds produced by our hybrid dual heuristic, which yields known optima (and prove optimality) in 90% (resp. 76%) within 100 seconds on the average.

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Telecommunication Network Capacity Design for Uncertain Demand

Andrade

Lisser²,

Maculan³

et al. 2004

Computational Optimization and Applications

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Gérard Plateau

An algorithm for the solution of the 0–1 knapsack problem

An efficient preprocessing procedure for the multidimensional 0–1 knapsack problem

Resolution of the 0–1 knapsack problem: Comparison of methods

An exact search for the solution of the surrogate dual of the 0–1 bidimensional knapsack problem

Heuristics and reduction methods for multiple constraints 0–1 linear programming problems

Lagrangean heuristics combined with reoptimization for the 0–1 bidimensional knapsack problem

An efficient hybrid heuristic method for the 0-1 exact k-item quadratic knapsack problem

Telecommunication Network Capacity Design for Uncertain Demand

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