On the maximum second eigenvalue of outerplanar graphs

Abstract

For a fixed positive integer k and a graph G, let λk(G) denote the k-th largest eigenvalue of the adjacency matrix of G. In 2017, Tait and Tobin proved that the maximum λ1(G) among all outerplanar graphs on n vertices is achieved by the fan graph K1 Pn-1. In this paper, we consider a similar problem of determining the maximum λ2 among all connected outerplanar graphs on n vertices. For n even and sufficiently large, we prove that the maximum λ2 is uniquely achieved by the graph (K1 Pn/2-1)\!\!-\!\!(K1 Pn/2-1), which is obtained by connecting two disjoint copies of (K1 Pn/2-1) through a new edge joining their smallest degree vertices. When n is odd and sufficiently large, the extremal graphs are not unique. The extremal graphs are those graphs G that contain a cut vertex u such that G \u\ is isomorphic to 2(K1 Pn/2-1). We also determine the maximum λ2 among all 2-connected outerplanar graphs and asymptotically determine the maximum of λk(G) among all connected outerplanar graphs for any fixed k.