A conjecture of eigenvalues of threshold graphs

Abstract

Let An be the anti-regular graph of order n. It was conjectured that among all threshold graphs on n vertices, An has the smallest positive eigenvalue and the largest eigenvalue less than -1. Recently, in Cesar2 was given partial results for this conjecture and identified the critical cases where a more refined method is needed. In this paper, we deal with these cases and confirm that conjecture holds.