The $n$-queens completion problem
Abstract
An -queens configuration is a placement of mutually non-attacking queens on an chessboard. The -queens completion problem, introduced by Nauck in 1850, is to decide whether a given partial configuration can be completed to an -queens configuration. In this paper, we study an extremal aspect of this question, namely: how small must a partial configuration be so that a completion is always possible? We show that any placement of at most mutually non-attacking queens can be completed. We also provide partial configurations of roughly queens that cannot be completed, and formulate a number of interesting problems. Our proofs connect the queens problem to rainbow matchings in bipartite graphs and use probabilistic arguments together with linear programming duality.
Cite
@article{arxiv.2111.11402,
title = {The $n$-queens completion problem},
author = {Stefan Glock and David Munhá Correia and Benny Sudakov},
journal= {arXiv preprint arXiv:2111.11402},
year = {2022}
}
Comments
to appear in Research in the Mathematical Sciences