Spectral radius of graphs of given size with forbidden a fan graph F6
Abstract
Let Fk=K1 Pk-1 be the fan graph on k vertices. A graph is said to be Fk-free if it does not contain Fk as a subgraph. Yu et al. in [arXiv:2404.03423] conjectured that for k≥2 and m sufficiently large, if G is an F2k+1-free or F2k+2-free graph, then λ(G)≤ k-1+4m-k2+12 and the equality holds if and only if G Kk(mk-k-12)K1. Recently, Li et al. in [arXiv:2409.15918] showed that the above conjecture holds for k≥ 3. The only left case is for k=2, which corresponds to F5 or F6. Since the case of F5 was solved by Yu et al. in [arXiv:2404.03423] and Zhang and Wang in [On the spectral radius of graphs without a gem, Discrete Math. 347 (2024) 114171]. So, one needs only to deal with the case of F6. In this paper, we solve the only left case by determining the maximum spectral radius of F6-free graphs with size m≥ 88, and the corresponding extremal graph.
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