Large part of combinatorial optimization research has been devoted to the study of exact methods leading to a number of very diversified solution approaches. Some of those older frameworks can now be revisited in a metaheuristic perspective, as they are quite general frameworks for dealing with optimization problems. In this work, we propose to investigate the possibility of reinterpreting decompositions, with special emphasis on the related Benders and Lagrangean relaxation techniques. We show how these techniques, whose heuristic effectiveness is already testified by a wide literature, can be framed as a “master process that guides and modifies the operations of subordinate heuristics”, i.e., as metaheuristics. Obvious advantages arise fr...
© 2017 Elsevier B.V. This paper is concerned with a partitioning problem. One of the applications, a...
We introduce a metaheuristic framework for combinatorial optimization. Our framework is similar to m...
Despite the recent very significant progress concerning algorithms for combinatorial optimization pr...
Large part of combinatorial optimization research has been devoted to the study of exact methods lea...
none3siDecompositions are methods derived from the “divide et impera” principle, dictating to break ...
Decomposition techniques are well-known as a means for obtaining tight lower bounds for combinatoria...
Optimization plainly dominates the design, planning, operation, and c- trol of engineering systems. ...
Benders decomposition entails a two-stage optimization approach to a mixed integer program: first-s...
In recent years, there have been significant advances in the theory and application of meta-heuristi...
In a period when optimization has entered almost every facet of our lives, this thesis is designed t...
Benders decomposition is a solution method for solving certain large-scale optimization problems. In...
The use of meta-heuristics for solving combinatorial optimisation has now a long history, and there ...
We overview metaheuristics, applied to Combinatorial Optimization (CO) problems, and survey the most...
In the past few decades, metaheuristics have demonstrated their suitability in addressing complex pr...
Benders decomposition is a well-known procedure for solving a combinatorial optimization problem by ...
© 2017 Elsevier B.V. This paper is concerned with a partitioning problem. One of the applications, a...
We introduce a metaheuristic framework for combinatorial optimization. Our framework is similar to m...
Despite the recent very significant progress concerning algorithms for combinatorial optimization pr...
Large part of combinatorial optimization research has been devoted to the study of exact methods lea...
none3siDecompositions are methods derived from the “divide et impera” principle, dictating to break ...
Decomposition techniques are well-known as a means for obtaining tight lower bounds for combinatoria...
Optimization plainly dominates the design, planning, operation, and c- trol of engineering systems. ...
Benders decomposition entails a two-stage optimization approach to a mixed integer program: first-s...
In recent years, there have been significant advances in the theory and application of meta-heuristi...
In a period when optimization has entered almost every facet of our lives, this thesis is designed t...
Benders decomposition is a solution method for solving certain large-scale optimization problems. In...
The use of meta-heuristics for solving combinatorial optimisation has now a long history, and there ...
We overview metaheuristics, applied to Combinatorial Optimization (CO) problems, and survey the most...
In the past few decades, metaheuristics have demonstrated their suitability in addressing complex pr...
Benders decomposition is a well-known procedure for solving a combinatorial optimization problem by ...
© 2017 Elsevier B.V. This paper is concerned with a partitioning problem. One of the applications, a...
We introduce a metaheuristic framework for combinatorial optimization. Our framework is similar to m...
Despite the recent very significant progress concerning algorithms for combinatorial optimization pr...