On a conjecture of Laplacian energy of trees

Abstract

Let G be a simple graph with n vertices, m edges having Laplacian eigenvalues μ1, μ2, …, μn-1,μn=0. The Laplacian energy LE(G) is defined as LE(G)=Σi=1n|μi-d|, where d=2mn is the average degree of G. Radenkovi\'c and Gutman conjectured that among all trees of order n, the path graph Pn has the smallest Laplacian energy. Let Tn(d) be the family of trees of order n having diameter d . In this paper, we show that Laplacian energy of any tree T∈ Tn(4) is greater than the Laplacian energy of Pn, thereby proving the conjecture for all trees of diameter 4. We also show the truth of conjecture for all trees with number of non-pendent vertices at most 9n25-2. Further, we give some sufficient conditions for the conjecture to hold for a tree of order n.