On a distance Laplacian analog of Brouwer's conjecture for several classes of graphs

Abstract

Zhou et al. (2025) proposed a distance Laplacian analog of Brouwer's conjecture on partial sums of Laplacian eigenvalues, asserting that for any connected graph G, Σi=1r ∂iL(G) W(G)+r+23, where ∂iL(G) are the eigenvalues of the distance Laplacian matrix and W(G) is the Wiener index. We prove this inequality for three broad classes of graphs, thereby improving and extending existing results. First, we prove that all connected graphs of diameter at most D satisfy the inequality once the order n satisfies n49(D+1)3. Second, we show that the inequality holds for every diameter-2 graph with the only exceptions being K1,3 at r=2 and K1,4 at r=3. Third, we prove that if the maximum degree is Δ(G)=n-k, then the inequality holds for all n N(k), where N(2)=10 and N(k)= 5(k-1)3/2 for k 3. Our proofs rely on decomposing the distance Laplacian matrix into Laplacian matrices of auxiliary graphs whose edges are vertex pairs at distance at least a prescribed value, together with classical eigenvalue inequalities.