English

Fan-complete Ramsey numbers

Combinatorics 2025-01-31 v2

Abstract

For graphs GG and HH, we consider Ramsey numbers r(G,H)r(G,H) with tight lower bounds, namely, r(G,H)(χ(G)1)(H1)+1,r(G,H) \geq (\chi(G)-1)(|H|-1)+1, where χ(G)\chi(G) denotes the chromatic number of GG and H|H| denotes the number of vertices in HH. We say HH is GG-good if the equality holds. Let G+HG+H be the join graph obtained from graphs GG and HH by adding all edges between the disjoint vertex sets of GG and HH. Let nHnH denote the union graph of nn disjoint copies of HH. We show that K1+nHK_1+nH is KpK_p-good if nn is sufficiently large. In particular, the fan-graph Fn=K1+nK2F_n=K_1 + n K_2 is KpK_p-good if n27p2n\geq 27p^2, improving previous tower-type lower bounds for nn due to Li and Rousseau (1996). Moreover, we give a stronger lower bound inequality for Ramsey number r(G,K1+F)r(G, K_1+F) for the case of G=Kp(a1,a2,,ap)G=K_p(a_1, a_2, \dots, a_p), the complete pp-partite graph with a1=1a_1=1 and aiai+1a_i \leq a_{i+1}. In particular, using a stability-supersaturation lemma by Fox, He and Wigderson (2021), we show that for any fixed graph HH, \begin{align*} r(G,K_1+nH) = \left\{ \begin{array}{ll} (p-1)(n |H|+a_2-1)+1 & \textrm{if nH+a21n|H|+a_2-1 is even or a21a_2-1 is even,}\\ (p-1)(n |H|+a_2-2)+1 & \textrm{otherwise,} \end{array} \right. \end{align*} where G=Kp(1,a2,,ap)G=K_p(1,a_2, \dots, a_p) with aia_i's satisfying some mild conditions and nn is sufficiently large. The special case of H=K1H=K_1 gives an answer to Burr's question (1981) about the discrepancy of r(G,K1,n)r(G, K_{1,n}) from GG-goodness for sufficiently large nn. All bounds of nn we obtain are not of tower-types.

Keywords

Cite

@article{arxiv.2208.05829,
  title  = {Fan-complete Ramsey numbers},
  author = {Fan Chung and Qizhong Lin},
  journal= {arXiv preprint arXiv:2208.05829},
  year   = {2025}
}

Comments

16 pages

R2 v1 2026-06-25T01:38:47.803Z