English

Good Graph Hunting

Combinatorics 2015-08-11 v1

Abstract

Given graphs H1,H2,,HkH_1, H_2, \dots, H_k, the Ramsey number R(H1,,Hk)R(H_1, \dots, H_k) is the smallest integer nn for which in any coloring of the edges of the complete graph KnK_n with colors 1,2,,k1,2,\dots,k, there is some color ii with a monochromatic copy of HiH_i. We call a tuple (H1,,Hk)(H_1, \dots, H_k) good if for every kk-coloring of the edges of an R(H1,,Hk)R(H_1, \dots, H_k)-chromatic graph, there is some color ii with a monochromatic copy of HiH_i. We call a graph HH kk-good if the kk-tuple (H,H,,H)(H, H, \dots, H) is good, and HH is good if it is kk-good for every kk. Bialostocki and Gy\'arf\'as proved that matchings are good and asked whether every acyclic HH is good. A natural strategy shows that P4P_4 is kk-good for k3k \not = 3 and that (P4,P5)(P_4, P_5) is good. We develop a new technique for showing that a graph is 22-good, and we apply it successfully to P5P_5, P6P_6, and P7P_7.

Keywords

Cite

@article{arxiv.1508.01833,
  title  = {Good Graph Hunting},
  author = {Philip Garrison},
  journal= {arXiv preprint arXiv:1508.01833},
  year   = {2015}
}
R2 v1 2026-06-22T10:28:56.505Z