Looking for the Hardest Hamiltonian Cycle Problem Instances
Joeri Sleegers, Daan van den Berg
2020
Abstract
We use two evolutionary algorithms to make hard instances of the Hamiltonian cycle problem. Hardness, or fitness, is defined as the number of recursions required by Vandegriend-Culberson, the best known exact backtracking algorithm for the problem. The hardest instances, all non-Hamiltonian, display a high degree of regularity and scalability across graph sizes. These graphs are found multiple times through independent runs and in both algorithms, suggestion the search space might contain monotonic paths to the global maximum. The one-bit neighbourhoods of these instances are also analyzed, and show that these hardest instances are separated from the easiest problem instances by just one bit of information. For Hamiltonian-bound graphs, the hardest instances are less uniform and substantially easier than their non-Hamiltonian counterparts. Reasons for these less-conclusive results are presented and discussed.
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in Harvard Style
Sleegers J. and van den Berg D. (2020). Looking for the Hardest Hamiltonian Cycle Problem Instances. In Proceedings of the 12th International Joint Conference on Computational Intelligence (IJCCI 2020) - Volume 1: ECTA; ISBN 978-989-758-475-6, SciTePress, pages 40-48. DOI: 10.5220/0010066900400048
in Bibtex Style
@conference{ecta20,
author={Joeri Sleegers and Daan van den Berg},
title={Looking for the Hardest Hamiltonian Cycle Problem Instances},
booktitle={Proceedings of the 12th International Joint Conference on Computational Intelligence (IJCCI 2020) - Volume 1: ECTA},
year={2020},
pages={40-48},
publisher={SciTePress},
organization={INSTICC},
doi={10.5220/0010066900400048},
isbn={978-989-758-475-6},
}
in EndNote Style
TY - CONF
JO - Proceedings of the 12th International Joint Conference on Computational Intelligence (IJCCI 2020) - Volume 1: ECTA
TI - Looking for the Hardest Hamiltonian Cycle Problem Instances
SN - 978-989-758-475-6
AU - Sleegers J.
AU - van den Berg D.
PY - 2020
SP - 40
EP - 48
DO - 10.5220/0010066900400048
PB - SciTePress