Laplacian Distribution and Domination

Abstract

Let mG(I) denote the number of Laplacian eigenvalues of a graph G in an interval I, and let γ(G) denote its domination number. We extend the recent result mG[0,1) ≤ γ(G), and show that isolate-free graphs also satisfy γ(G) ≤ mG[2,n]. In pursuit of better understanding Laplacian eigenvalue distribution, we find applications for these inequalities. We relate these spectral parameters with the approximability of γ(G), showing that γ(G)mG[0,1) ∈ O( n). However, γ(G) ≤ mG[2, n] ≤ (c + 1) γ(G) for c-cyclic graphs, c ≥ 1. For trees T, γ(T) ≤ mT[2, n] ≤ 2 γ(G).