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On tight $(k,\ell)$-stable graphs

Combinatorics 2024-04-03 v1

Abstract

For integers k>0k>\ell\ge0, a graph GG is (k,)(k,\ell)-stable if α(GS)α(G)\alpha(G-S)\geq \alpha(G)-\ell for every SV(G)S\subseteq V(G) with S=k|S|=k. A recent result of Dong and Wu [SIAM J. Discrete Math., 36 (2022) 229--240] shows that every (k,)(k,\ell)-stable graph GG satisfies α(G)(V(G)k+1)/2+\alpha(G) \le \lfloor ({|V(G)|-k+1})/{2}\rfloor+\ell. A (k,)(k,\ell)-stable graph GG is tight if α(G)=(V(G)k+1)/2+\alpha(G) = \lfloor ({|V(G)|-k+1})/{2}\rfloor+\ell; and qq-tight for some integer q0q\ge0 if α(G)=(V(G)k+1)/2+q\alpha(G) = \lfloor ({|V(G)|-k+1})/{2}\rfloor+\ell-q. In this paper, we first prove that for all k24k\geq 24, the only tight (k,0)(k, 0)-stable graphs are Kk+1K_{k+1} and Kk+2K_{k+2}, answering a question of Dong and Luo [arXiv: 2401.16639]. We then prove that for all nonnegative integers k,,qk, \ell, q with k3+3k\geq 3\ell+3, every qq-tight (k,)(k,\ell)-stable graph has at most k33+23(+2q+4)2k-3\ell-3+2^{3(\ell+2q+4)^2} vertices, answering a question of Dong and Luo in the negative.

Keywords

Cite

@article{arxiv.2404.01639,
  title  = {On tight $(k,\ell)$-stable graphs},
  author = {Xiaonan Liu and Zi-Xia Song and Zhiyu Wang},
  journal= {arXiv preprint arXiv:2404.01639},
  year   = {2024}
}

Comments

11 pages

R2 v1 2026-06-28T15:41:05.209Z