English

Ramsey Theory on the Integer Grid: The "L" Problem

Combinatorics 2025-02-10 v1

Abstract

In an [n]×[n][n] \times [n] integer grid, a monochromatic LL is any set of points {(i,j),(i,j+t),(i+t,j+t)}\{(i, j), (i, j+t), (i+t, j+t)\} for some positive integer tt, where 1i,j,i+t,j+tn1 \leq i, j, i+t, j+t \leq n. In this paper, we investigate the upper bound for the smallest integer nn such that a 33-colored n×nn \times n grid is guaranteed to contain a monochromatic LL. We use various methods, such as counting intervals on the main diagonal and using Golomb rulers, to improve the upper bound. This bound originally sat at 2593, and we improve it first to 1803, then to 1573, then to 772, and finally to 493. In the latter part of this paper, we discuss the lower bound and our attempts to improve it using SAT solvers.

Keywords

Cite

@article{arxiv.2502.05162,
  title  = {Ramsey Theory on the Integer Grid: The "L" Problem},
  author = {Isaac Mammel and William Smith and Carl Yerger},
  journal= {arXiv preprint arXiv:2502.05162},
  year   = {2025}
}

Comments

This version of the paper includes discussion on the lower bound and SAT solvers that was not deemed relevant for the main paper

R2 v1 2026-06-28T21:36:35.926Z