Piercing the chessboard
Combinatorics
2023-07-31 v3 Metric Geometry
Abstract
We consider the minimum number of lines and needed to intersect or pierce, respectively, all the cells of the chessboard. Determining these values can also be interpreted as a strengthening of the classical plank problem for integer points. Using the symmetric plank theorem of K. Ball, we prove that for each . Studying the piercing problem, we show that for , where the upper bound is conjectured to be sharp. The lower bound is proven by using the linear programming method, whose limitations are also demonstrated.
Cite
@article{arxiv.2111.09702,
title = {Piercing the chessboard},
author = {Gergely Ambrus and Imre Bárány and Péter Frankl and Dániel Varga},
journal= {arXiv preprint arXiv:2111.09702},
year = {2023}
}
Comments
15 pages, 7 figures. Final, accepted version. Color of figures modified in order to comply with BW print