Hard combinatorial optimization problems deal with the search for the minimum cost solutions (ground states) of discrete systems under strong constraints. A transformation of state variables may enhance computational tractability. It has been argued that these state encodings are to be chosen invertible to retain the original size of the state space. Here we show how redundant non-invertible encodings enhance optimization by enriching the density of low-energy states. In addition, smooth landscapes may be established on encoded state spaces to guide local search dynamics towards the ground state
In a series of papers we introduced a novel model for combinatorial landscapes that we called Local ...
Les problèmes d'optimisation combinatoire sont généralement NP-difficiles et les méthodes exactes de...
We propose a network characterization of combinatorial fitness landscapes by adapting the notion of ...
Hard combinatorial optimization problems deal with the search for the minimum cost solutions (ground...
Hard combinatorial optimization problems deal with the search for the minimum cost solutions (ground...
The traditional way of tackling discrete optimization problems is by using local search on suitably ...
Combinatorial optimization involves finding an optimal solution in a finite set of options; many eve...
The landscape formalism unites a finite candidate solution set to a neighborhood topology and an obj...
Local search is widely used to solve combinatorial optimisation problems and to model biological evo...
We introduce a classifying measure of fitness landscapes - the density of states - for continuous an...
Many problems from combinatorial optimization are NP-hard, so that exact methods remain inefficient ...
Fitness landscape rotation has been widely used in the field of dynamic combinatorial optimisation t...
Commonly there are two types of local search approaches known to treat combinatorial optimization pr...
We describe an effective landscape introduced in [1] for the analysis of Constraint Satisfaction p...
International audienceOne of the most commonly-used metaphors to describe the process of heuristic s...
In a series of papers we introduced a novel model for combinatorial landscapes that we called Local ...
Les problèmes d'optimisation combinatoire sont généralement NP-difficiles et les méthodes exactes de...
We propose a network characterization of combinatorial fitness landscapes by adapting the notion of ...
Hard combinatorial optimization problems deal with the search for the minimum cost solutions (ground...
Hard combinatorial optimization problems deal with the search for the minimum cost solutions (ground...
The traditional way of tackling discrete optimization problems is by using local search on suitably ...
Combinatorial optimization involves finding an optimal solution in a finite set of options; many eve...
The landscape formalism unites a finite candidate solution set to a neighborhood topology and an obj...
Local search is widely used to solve combinatorial optimisation problems and to model biological evo...
We introduce a classifying measure of fitness landscapes - the density of states - for continuous an...
Many problems from combinatorial optimization are NP-hard, so that exact methods remain inefficient ...
Fitness landscape rotation has been widely used in the field of dynamic combinatorial optimisation t...
Commonly there are two types of local search approaches known to treat combinatorial optimization pr...
We describe an effective landscape introduced in [1] for the analysis of Constraint Satisfaction p...
International audienceOne of the most commonly-used metaphors to describe the process of heuristic s...
In a series of papers we introduced a novel model for combinatorial landscapes that we called Local ...
Les problèmes d'optimisation combinatoire sont généralement NP-difficiles et les méthodes exactes de...
We propose a network characterization of combinatorial fitness landscapes by adapting the notion of ...