Maximum spread of Ks,t-minor-free graphs

Abstract

The spread of a graph G is the difference between the largest and smallest eigenvalue of the adjacency matrix of G. In this paper, we consider the family of graphs which contain no Ks,t-minor. We show that for any t≥ s ≥ 2 and sufficiently large n, there is an integer t such that the extremal n-vertex Ks,t-minor-free graph attaining the maximum spread is the graph obtained by joining a graph L on (s-1) vertices to the disjoint union of 2n+t3t copies of Kt and n-s+1 - t 2n+t3t isolated vertices. Furthermore, we give an explicit formula for t and an explicit description for the graph L for t ≥ 32(s-3) +4s-1.

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