Evolutionary Computation in Combinatorial Optimization, 1st ed. 2016 16th European Conference, EvoCOP 2016, Porto, Portugal, March 30 -- April 1, 2016, Proceedings Theoretical Computer Science and General Issues Series
Coordonnateurs : Chicano Francisco, Hu Bin, García-Sánchez Pablo
This book constitutes the refereed proceedings of the 16th European Conference on Evolutionary Computation in Combinatorial Optimization, EvoCOP 2016, held in Porto, Portugal, in March/April 2016, co-located with the Evo*2015 events EuroGP, EvoMUSART and EvoApplications.
The 17 revised full papers presented were carefully reviewed and selected from 44 submissions. The papers cover methodology, applications and theoretical studies. The methods included evolutionary and memetic algorithms, variable neighborhood search, particle swarm optimization, hyperheuristics, mat-heuristic and other adaptive approaches. Applications included both traditional domains, such as graph coloring, vehicle routing, the longest common subsequence problem, the quadratic assignment problem; and new(er) domains such as the traveling thief problem, web service location, and finding short addition chains. The theoretical studies involved fitness landscape analysis, local search and recombination operator analysis, and the big valley search space hypothesis. The consideration of multiple objectives, dynamic and noisy environments was also present in a number of articles.
Includes supplementary material: sn.pub/extras
Date de parution : 03-2016
Ouvrage de 267 p.
15.5x23.5 cm
Thèmes d’Evolutionary Computation in Combinatorial Optimization :
Mots-clés :
Evolutionary algorithms; Hyper-heuristics; Metaheuristics; Multi-objective optimisation; Particle swarm optimisation; Ant colony optimization; Artificial immune systems; Combinatorial optimisation; Discrete space search; Estimation of distribution algorithms; Genetic algorithms; Graph problem; Local optima networks; Permutation problems; Quadratic assignment; Scheduling; Search methodologies; Timetabling; Travelling thief problem; Vehicle routing