Ramsey numbers of path-matchings, covering designs and 1-cores

Abstract

A path-matching of order p is a vertex disjoint union of nontrivial paths spanning p vertices. Burr and Roberts, and Faudree and Schelp determined the 2-color Ramsey number of path-matchings. In this paper we study the multicolor Ramsey number of path-matchings. Given positive integers r, p1, …, pr, define RPM(p1, …, pr) to be the smallest integer n such that in any r-coloring of the edges of Kn there exists a path-matching of color i and order at least pi for some i∈ [r]. Our main result is that for r≥ 2 and p1≥ …≥ pr≥ 2, if p1≥ 2r-2, then \[RPM(p1, …, pr)= p1- (r-1) + Σi=2rpi3.\] Perhaps surprisingly, we show that when p1<2r-2, it is possible that RPM(p1, …, pr) is larger than p1- (r-1) + Σi=2rpi3, but in any case we determine the correct value to within a constant (depending on r); i.e. \[p1- (r-1) + Σi=2rpi3 ≤ RPM(p1, …, pr)≤ p1-r3+Σi=2rpi3.\] As a corollary we get that in every r-coloring of Kn there is a monochromatic path-matching of order at least 3nr+2, which is essentially best possible. We also determine RPM(p1, …, pr) in all cases when the number of colors is at most 4. The proof of the main result uses a minimax theorem for path-matchings derived from a result of Las Vergnas (extending Tutte's 1-factor theorem) to show that the value of RPM(p1, …, pr) depends on the block sizes in covering designs (which can be also formulated in terms of monochromatic 1-cores in colored complete graphs). Then we obtain the result above by giving estimates on the block sizes in covering designs in the arbitrary (non-uniform) case.