On tight (k,)-stable graphs
Abstract
For integers k>0, a graph G is (k,)-stable if α(G-S)≥ α(G)- for every S⊂eq V(G) with |S|=k. A recent result of Dong and Wu [SIAM J. Discrete Math., 36 (2022) 229--240] shows that every (k,)-stable graph G satisfies α(G) (|V(G)|-k+1)/2+. A (k,)-stable graph G is tight if α(G) = (|V(G)|-k+1)/2+; and q-tight for some integer q0 if α(G) = (|V(G)|-k+1)/2+-q. In this paper, we first prove that for all k≥ 24, the only tight (k, 0)-stable graphs are Kk+1 and Kk+2, answering a question of Dong and Luo [arXiv: 2401.16639]. We then prove that for all nonnegative integers k, , q with k≥ 3+3, every q-tight (k,)-stable graph has at most k-3-3+23(+2q+4)2 vertices, answering a question of Dong and Luo in the negative.
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