Heuristic search procedures that aspire to find globally optimal solutions to hard combinatorial optimization problems usually require some type of diversification to overcome local optimality. One way to achieve diversification is to re-start the procedure from a new solution once a region has been explored. In this chapter we describe the best known multi-start methods for solving optimization problems. We propose classifying these methods in terms of their use of randomization, memory and degree of rebuild. We also present a computational comparison of these meth-ods on solving the Maximum Diversity Problem in terms of solution quality and diversification power
In this paper, we propose a simple global optimisation algorithm inspired by Pareto’s principle. Thi...
[EN]This book explains the most prominent and some promising new, general techniques that combine me...
We overview metaheuristics, applied to Combinatorial Optimization (CO) problems, and survey the most...
The Maximum Diversity Problem (MDP) requires to extract a subset M of given cardinality from a set N...
This paper presents extensive computational experiments to compare 10 heuristics and 20 metaheuristi...
Local search algorithms for global optimization often suffer from getting trapped in a local optimum...
In population-based meta-heuristics, the generation and maintenance of diversity seem to be crucial ...
Most state-of-the-art optimization algorithms utilize restart to resample new initial solutions to a...
Finding diverse solutions has become important in many combinatorial search domains, including Autom...
International audienceThe challenge of maximizing the diversity of a collection of points arises in ...
Abstract. Constructive multi-start search algorithms are commonly used to address combinatorial opti...
The work is devoted to the development and study of a method for solving global optimization proble...
We address two variations of the maximum diversity problem which arises when m elements are to be se...
The Maximum Diversity Problem (MDP) consists of selecting elements from some large collection such t...
The Maximum Diversity Problem (MDP) consists in determining a subset M of given cardinality from a s...
In this paper, we propose a simple global optimisation algorithm inspired by Pareto’s principle. Thi...
[EN]This book explains the most prominent and some promising new, general techniques that combine me...
We overview metaheuristics, applied to Combinatorial Optimization (CO) problems, and survey the most...
The Maximum Diversity Problem (MDP) requires to extract a subset M of given cardinality from a set N...
This paper presents extensive computational experiments to compare 10 heuristics and 20 metaheuristi...
Local search algorithms for global optimization often suffer from getting trapped in a local optimum...
In population-based meta-heuristics, the generation and maintenance of diversity seem to be crucial ...
Most state-of-the-art optimization algorithms utilize restart to resample new initial solutions to a...
Finding diverse solutions has become important in many combinatorial search domains, including Autom...
International audienceThe challenge of maximizing the diversity of a collection of points arises in ...
Abstract. Constructive multi-start search algorithms are commonly used to address combinatorial opti...
The work is devoted to the development and study of a method for solving global optimization proble...
We address two variations of the maximum diversity problem which arises when m elements are to be se...
The Maximum Diversity Problem (MDP) consists of selecting elements from some large collection such t...
The Maximum Diversity Problem (MDP) consists in determining a subset M of given cardinality from a s...
In this paper, we propose a simple global optimisation algorithm inspired by Pareto’s principle. Thi...
[EN]This book explains the most prominent and some promising new, general techniques that combine me...
We overview metaheuristics, applied to Combinatorial Optimization (CO) problems, and survey the most...