Remark on inequalities for the Laplacian spread of graphs

Igor Milovanović; Emina Milovanović

Displaying similar documents to “Remark on inequalities for the Laplacian spread of graphs”

The Laplacian spread of graphs

Zhifu You, Bo Lian Liu (2012)

Czechoslovak Mathematical Journal

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The Laplacian spread of a graph is defined as the difference between the largest and second smallest eigenvalues of the Laplacian matrix of the graph. In this paper, bounds are obtained for the Laplacian spread of graphs. By the Laplacian spread, several upper bounds of the Nordhaus-Gaddum type of Laplacian eigenvalues are improved. Some operations on Laplacian spread are presented. Connected $c$ -cyclic graphs with $n$ vertices and Laplacian spread $n - 1$ are discussed.

On the sum of powers of Laplacian eigenvalues of bipartite graphs

Bo Zhou, Aleksandar Ilić (2010)

Czechoslovak Mathematical Journal

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For a bipartite graph $G$ and a non-zero real $α$ , we give bounds for the sum of the $α$ th powers of the Laplacian eigenvalues of $G$ using the sum of the squares of degrees, from which lower and upper bounds for the incidence energy, and lower bounds for the Kirchhoff index and the Laplacian Estrada index are deduced.

On the Laplacian, signless Laplacian and normalized Laplacian characteristic polynomials of a graph

Ji-Ming Guo, Jianxi Li, Wai Chee Shiu (2013)

Czechoslovak Mathematical Journal

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The Laplacian, signless Laplacian and normalized Laplacian characteristic polynomials of a graph are the characteristic polynomials of its Laplacian matrix, signless Laplacian matrix and normalized Laplacian matrix, respectively. In this paper, we mainly derive six reduction procedures on the Laplacian, signless Laplacian and normalized Laplacian characteristic polynomials of a graph which can be used to construct larger Laplacian, signless Laplacian and normalized Laplacian cospectral...

Some properties of the distance Laplacian eigenvalues of a graph

Mustapha Aouchiche, Pierre Hansen (2014)

Czechoslovak Mathematical Journal

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The distance Laplacian of a connected graph $G$ is defined by $ℒ = Diag (Tr) - 𝒟$ , where $𝒟$ is the distance matrix of $G$ , and $Diag (Tr)$ is the diagonal matrix whose main entries are the vertex transmissions in $G$ . The spectrum of $ℒ$ is called the distance Laplacian spectrum of $G$ . In the present paper, we investigate some particular distance Laplacian eigenvalues. Among other results, we show that the complete graph is the unique graph with only two distinct distance Laplacian eigenvalues. We establish some properties...

Algebraic conditions for $t$ -tough graphs

Bo Lian Liu, Siyuan Chen (2010)

Czechoslovak Mathematical Journal

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We give some algebraic conditions for $t$ -tough graphs in terms of the Laplacian eigenvalues and adjacency eigenvalues of graphs.

The Laplacian spread of tricyclic graphs.

Chen, Yanqing, Wang, Ligong (2009)

The Electronic Journal of Combinatorics [electronic only]

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Displaying similar documents to “Remark on inequalities for the Laplacian spread of graphs”

The Laplacian spread of graphs

On the sum of powers of Laplacian eigenvalues of bipartite graphs

On the Laplacian, signless Laplacian and normalized Laplacian characteristic polynomials of a graph

Some properties of the distance Laplacian eigenvalues of a graph

Algebraic conditions for t -tough graphs

The Laplacian spread of tricyclic graphs.

Algebraic conditions for $t$ -tough graphs