Minimal Correction Subsets (MCSs) have been successfully applied to find approximate solutions to several real-world single-objective optimization problems. However, only recently have MCSs been used to solve Multi-Objective Combinatorial Optimization (MOCO) problems. In particular, it has been shown that all optimal solutions of MOCO problems with linear objective functions can be found by an MCS enumeration procedure. In this paper, we show that the approach of MCS enumeration can also be applied to MOCO problems where objective functions are divisions of linear expressions. Hence, it is not necessary to use a linear approximation of these objective functions. Additionally, we also propose the integration of diversification techniques on...
Abstract. Large neighborhood search (LNS) [25] is a framework that combines the expressiveness of co...
AbstractWe consider combinatorial optimization problems with a feasible solution set S⊆{0,1}n specif...
Multiobjective combinatorial optimization problems have received increasing attention in recent year...
Multi-Objective Combinatorial Optimization (MOCO) problems are ubiquitous in real-world applications...
This paper provides an annotated bibliography of multiple objective combinatorial optimization, MOCO...
Finding, all nondominated vectors for multi-objective combinatorial optimization (MOCO) problems is ...
International audienceIn this paper we propose a new algorithm called MCS for the search for solutio...
In this chapter we consider multi-objective optimisation problems with a combinatorial structure. Su...
International audienceIn this chapter we consider multi-objective optimisation problems with a combi...
Multi-Objective Combinatorial Optimization (MOCO) is fun-damental to the development and optimizatio...
Multiobjective combinatorial optimization problems have received increasing attention in recent year...
When applied to multiobjective combinatorial optimization problems defined in terms of Pareto optima...
Multiobjective combinatorial optimization (MOCO) problems can be found in many real-world applicatio...
Combinatorial optimization problems require selecting the best solution from a discrete (albeit ofte...
In this paper, we present a general framework for designing approximation schemes for combinatorial ...
Abstract. Large neighborhood search (LNS) [25] is a framework that combines the expressiveness of co...
AbstractWe consider combinatorial optimization problems with a feasible solution set S⊆{0,1}n specif...
Multiobjective combinatorial optimization problems have received increasing attention in recent year...
Multi-Objective Combinatorial Optimization (MOCO) problems are ubiquitous in real-world applications...
This paper provides an annotated bibliography of multiple objective combinatorial optimization, MOCO...
Finding, all nondominated vectors for multi-objective combinatorial optimization (MOCO) problems is ...
International audienceIn this paper we propose a new algorithm called MCS for the search for solutio...
In this chapter we consider multi-objective optimisation problems with a combinatorial structure. Su...
International audienceIn this chapter we consider multi-objective optimisation problems with a combi...
Multi-Objective Combinatorial Optimization (MOCO) is fun-damental to the development and optimizatio...
Multiobjective combinatorial optimization problems have received increasing attention in recent year...
When applied to multiobjective combinatorial optimization problems defined in terms of Pareto optima...
Multiobjective combinatorial optimization (MOCO) problems can be found in many real-world applicatio...
Combinatorial optimization problems require selecting the best solution from a discrete (albeit ofte...
In this paper, we present a general framework for designing approximation schemes for combinatorial ...
Abstract. Large neighborhood search (LNS) [25] is a framework that combines the expressiveness of co...
AbstractWe consider combinatorial optimization problems with a feasible solution set S⊆{0,1}n specif...
Multiobjective combinatorial optimization problems have received increasing attention in recent year...