English

A heuristic search algorithm for discovering large Condorcet domains

Discrete Mathematics 2026-01-06 v4

Abstract

The study of large Condorcet domains (CD) has been a significant area of interest in voting theory. In this paper, our goal is to search for large CDs that are hitherto unknown. With a straightforward combinatorial definition, searching for large CDs is naturally suited for algorithmic optimisations. For each value of n>2, one can ask for the size of the largest CD, thus finding the largest CDs provides an important benchmark for heuristic-based combinatorial optimisation algorithms. Despite extensive research over the past three decades, the CD sizes identified in 1996 remain the best known for many values of n. When n>8, conducting an exhaustive search becomes computationally unfeasible, thereby prompting the use of heuristic methods. To address this, we developed a novel heuristic search algorithm in which a specially designed heuristic function, backed by a lookup database, directs the search towards promising branches in the search tree. Our algorithm found new large CDs of size 1082 (surpassing the previous record of 1069) for n=10, and 2349 (improving the previous 2324) for n=11. Notably, these newly discovered CDs exhibit characteristics distinct from those of known CDs.

Keywords

Cite

@article{arxiv.2303.06524,
  title  = {A heuristic search algorithm for discovering large Condorcet domains},
  author = {Bei Zhou and Søren Riis},
  journal= {arXiv preprint arXiv:2303.06524},
  year   = {2026}
}
R2 v1 2026-06-28T09:12:29.625Z