Planar and Outerplanar Spectral Extremal Problems based on Paths

Abstract

Let SPEXP(n,F) and SPEXOP(n,F) denote the sets of graphs with the maximum spectral radius over all n-vertex F-free planar and outerplanar graphs, respectively. Define tPl as a linear forest of t vertex-disjoint l-paths and Pt· l as a starlike tree with t branches of length l-1. Building on the structural framework by Tait and Tobin [J. Combin. Theory Ser. B, 2017] and the works of Fang, Lin and Shi [J. Graph Theory, 2024] on the planar spectral extremal graphs without vertex-disjoint cycles, this paper determines the extremal graphs in SPEXP(n,tPl) and SPEXOP(n,tPl) for sufficiently large n. When t=1, since tPl is a path of a specific length, our results adapt Nikiforov's findings [Linear Algebra Appl. 2010] under the (outer)planarity condition. When l=2, note that tPl consists of t independent K2, then as a corollary, we generalize the results of Wang, Huang and Lin [arXiv: 2402.16419] and Yin and Li [arXiv:2409.18598v2]. Moreover, motivated by results of Zhai and Liu [Adv. in Appl. Math, 2024], we consider the extremal problems for edge-disjoint paths and determine the extremal graphs in SPEXP(n,Pt· l) and SPEXOP(n,Pt· l) for sufficiently large n.

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