论文信息 - The Ramsey numbers of large cycles versus small wheels

The Ramsey numbers of large cycles versus small wheels

For two given graphs G and H, the Ramsey number R(G;H) is the smallest positive integer N such that for every graph F of order N the following holds: either F contains G as a subgraph or the complement of F contains H as a subgraph. In this paper, we determine the Ramsey number R(Cn;Wm) for m = 4 and m = 5. We show that R(Cn;W4) = 2n i 1 and R(Cn;W5) = 3n i 2 for n ¸ 5. For larger wheels it remains an open problem to determine R(Cn;Wm).

[1] Frank Harary,et al. Generalized Ramsey theory for graphs. III. Small off-diagonal numbers. , 1972 .

[2] Richard H. Schelp,et al. All Ramsey numbers for cycles in graphs , 1974, Discret. Math..

[3] George R. T. Hendry,et al. Ramsey numbers for graphs with five vertices , 1989, J. Graph Theory.

[4] Kung-Kuen Tse. On the Ramsey number of the quadrilateral versus the book and the wheel , 2003, Australas. J Comb..

[5] Frank Harary,et al. Generalized Ramsey theory for graphs , 1972 .

[6] Paul Erdös,et al. A note on Hamiltonian circuits , 1972, Discret. Math..

[7] Edy Tri Baskoro,et al. The Ramsey numbers of large star-like trees versus large odd wheels , 2002 .

[8] Paul Erdös,et al. Generalizations of a Ramsey-theoretic result of chvátal , 1983, J. Graph Theory.

[9] O. Ore. Note on Hamilton Circuits , 1960 .