A SAT-based Resolution of Lam's Problem
Abstract
In 1989, computer searches by Lam, Thiel, and Swiercz experimentally resolved Lam's problem from projective geometrythe long-standing problem of determining if a projective plane of order ten exists. Both the original search and an independent verification in 2011 discovered no such projective plane. However, these searches were each performed using highly specialized custom-written code and did not produce nonexistence certificates. In this paper, we resolve Lam's problem by translating the problem into Boolean logic and use satisfiability (SAT) solvers to produce nonexistence certificates that can be verified by a third party. Our work uncovered consistency issues in both previous searcheshighlighting the difficulty of relying on special-purpose search code for nonexistence results.
Keywords
Cite
@article{arxiv.2012.04715,
title = {A SAT-based Resolution of Lam's Problem},
author = {Curtis Bright and Kevin K. H. Cheung and Brett Stevens and Ilias Kotsireas and Vijay Ganesh},
journal= {arXiv preprint arXiv:2012.04715},
year = {2023}
}
Comments
To appear at the Thirty-Fifth AAAI Conference on Artificial Intelligence