论文信息 - (2018). Ramsey equivalence of Kn and Kn + Kn–1. Electronic Journal of Combinatorics , 25 (3), [#P3.4].

(2018). Ramsey equivalence of Kn and Kn + Kn–1. Electronic Journal of Combinatorics , 25 (3), [#P3.4].

We prove that, for $n\geqslant 4$, the graphs $K_n$ and $K_n+K_{n-1}$ are Ramsey equivalent. That is, if $G$ is such that any red-blue colouring of its edges creates a monochromatic $K_n$ then it must also possess a monochromatic $K_n+K_{n-1}$. This resolves a conjecture of Szabó, Zumstein, and Zürcher.The result is tight in two directions. Firstly, it is known that $K_n$ is not Ramsey equivalent to $K_n+2K_{n-1}$. Secondly, $K_3$ is not Ramsey equivalent to $K_3+K_{2}$. We prove that any graph which witnesses this non-equivalence must contain $K_6$ as a subgraph.

Anita Liebenau | Thomas F. Bloom | Anita Liebenau | T. Bloom

[1] V. Rödl,et al. The structure of critical Ramsey graphs , 1978 .

[2] T. Ueckerdt,et al. Conditions on Ramsey non-equivalence , 2015, 1501.06320.

[3] V. Rödl,et al. The Ramsey property for graphs with forbidden complete subgraphs , 1976 .

[4] Maria Axenovich,et al. Conditions on Ramsey Nonequivalence , 2017, J. Graph Theory.

[5] Yury Person,et al. What is Ramsey-equivalent to a clique? , 2013, J. Comb. Theory, Ser. B.

[6] Richard H. Schelp,et al. Ramsey-minimal graphs for forests , 1982, Discret. Math..

[7] Paul Erdös,et al. On the Difference between Consecutive Ramsey Numbers , 1989 .

[8] Vojtech Rödl,et al. On the use of senders in generalized ramsey theory for graphs , 1985, Discret. Math..

[9] Zehui Shao,et al. More Constructive Lower Bounds on Classical Ramsey Numbers , 2011, SIAM J. Discret. Math..

[10] J. Folkman. Graphs with Monochromatic Complete Subgraphs in Every Edge Coloring , 1970 .

[11] Tibor Szabó,et al. On the minimum degree of minimal Ramsey graphs , 2010, J. Graph Theory.