Many graph problems seek subgraphs of minimum weight that satisfy the problems’ constraints. Examples include the degree-constrained minimum spanning tree and traveling salesman problems. Low-weight edges predominate in optimal solutions to these problems, and the performance of evolutionary algorithms for them is often improved by biasing their operators to favor these edges. From the distributions of edges ’ ranks in optimal solutions to these two problems, we identify probabilities for edges that minimize the average expected time until mutation chooses them for inclusion in a solution. On instances of the degree-constrained minimum spanning tree problem, an evolutionary algorithm performs better with this operator than with alternative ...
The features of an evolutionary algorithm that most determine its performance are the coding by whic...
We investigate the Minimum Evolution Problem (MEP), an NP-hard network design problem arising from...
Given an undirected edge-weighted graph G and a positive integer m, the Constrained Forest Problem (...
Research has shown that for many single-objective graph problems where optimum solutions are compose...
Evolutionary algorithms have been shown to be very successful for a wide range of NP-hard combinator...
We study the minimum s-t-cut problem in graphs with costs on the edges in the context of evolutionar...
Given a connected, undirected graph G with labeled edges, the minimum-label spanning tree problem se...
We consider optimization problems on complete graphs with edge weights chosen from identical but ind...
Randomized search heuristics, among them randomized local search and evolutionary algorithms, are ap...
In many applications of evolutionary algorithms the computational cost of applying operators and sto...
The result. Parametric optimization pwblems that concern graphs with continuously changing edge weig...
AbstractRandomized search heuristics, among them randomized local search and evolutionary algorithms...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
We investigate the Minimum Evolution Problem (MEP), an NP-hard network design problem arising from...
Given a graph with positive edge weights and a positive integer m, the Constrained Forest Problem (C...
The features of an evolutionary algorithm that most determine its performance are the coding by whic...
We investigate the Minimum Evolution Problem (MEP), an NP-hard network design problem arising from...
Given an undirected edge-weighted graph G and a positive integer m, the Constrained Forest Problem (...
Research has shown that for many single-objective graph problems where optimum solutions are compose...
Evolutionary algorithms have been shown to be very successful for a wide range of NP-hard combinator...
We study the minimum s-t-cut problem in graphs with costs on the edges in the context of evolutionar...
Given a connected, undirected graph G with labeled edges, the minimum-label spanning tree problem se...
We consider optimization problems on complete graphs with edge weights chosen from identical but ind...
Randomized search heuristics, among them randomized local search and evolutionary algorithms, are ap...
In many applications of evolutionary algorithms the computational cost of applying operators and sto...
The result. Parametric optimization pwblems that concern graphs with continuously changing edge weig...
AbstractRandomized search heuristics, among them randomized local search and evolutionary algorithms...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
We investigate the Minimum Evolution Problem (MEP), an NP-hard network design problem arising from...
Given a graph with positive edge weights and a positive integer m, the Constrained Forest Problem (C...
The features of an evolutionary algorithm that most determine its performance are the coding by whic...
We investigate the Minimum Evolution Problem (MEP), an NP-hard network design problem arising from...
Given an undirected edge-weighted graph G and a positive integer m, the Constrained Forest Problem (...