Rado Numbers and SAT Computations
Abstract
Given a linear equation , the -color Rado number is the smallest integer such that every -coloring of contains a monochromatic solution to . The degree of regularity of , denoted , is the largest value such that is finite. In this article we present new theoretical and computational results about the Rado numbers and the degree of regularity of three-variable equations . % We use SAT solvers to compute many new values of the three-color Rado numbers for fixed integers and . We also give a SAT-based method to compute infinite families of these numbers. In particular, we show that the value of is equal to for . This resolves a conjecture of Myers and implies the conjecture that the generalized Schur numbers equal for . Our SAT solver computations, combined with our new combinatorial results, give improved bounds on and exact values for . We also give counterexamples to a conjecture of Golowich.
Cite
@article{arxiv.2210.03262,
title = {Rado Numbers and SAT Computations},
author = {Yuan Chang and Jesús A. De Loera and William J. Wesley},
journal= {arXiv preprint arXiv:2210.03262},
year = {2022}
}