The pigenhole principle and multicolor Ramsey numbers

Abstract

For integers k,r≥ 2, the diagonal Ramsey number Rr(k) is the minimum N∈N such that every r-coloring of the edges of a complete graph on N vertices yields on a monochromatic subgraph on k vertices. Here we make a careful effort of extracting explicit upper bounds for Rr(k) from the pigeonhole principle alone. Our main term improves on previously documented explicit bounds for r≥ 3, and we also consider an often ignored secondary term, which allows us to subtract a uniformly bounded below positive proportion of the main term. Asymptotically, we give a self-contained proof that Rr(k)≤ (3+e2)(r(k-2))!((k-2)!)r(1+or ∞(1)), and we conclude by noting that our methods combine with previous estimates on Rr(3) to improve the constant 3+e2 to 3+e2-d48, where d=66-R4(3)≥ 4. We also compare our formulas, and previously documented formulas, to some collected numerical data.