A spectral Erdos-S\'os theorem

Abstract

The famous Erdos-S\'os conjecture states that every graph of average degree more than t-1 must contain every tree on t+1 vertices. In this paper, we study a spectral version of this conjecture. For n>k, let Sn,k be the join of a clique on k vertices with an independent set of n-k vertices and denote by Sn,k+ the graph obtained from Sn,k by adding one edge. We show that for fixed k≥ 2 and sufficiently large n, if a graph on n vertices has adjacency spectral radius at least as large as Sn,k and is not isomorphic to Sn,k, then it contains all trees on 2k+2 vertices. Similarly, if a sufficiently large graph has spectral radius at least as large as Sn,k+, then it either contains all trees on 2k+3 vertices or is isomorphic to Sn,k+. This answers a two-part conjecture of Nikiforov affirmatively.