The eigenvalues of the normalized Laplacian of a graph provide information on its topological and structural characteristics and also on some relevant dynamical aspects, specifically in relation to random walks. In this paper we determine the spectra of the normalized Laplacian of iterated triangulations of a generic simple connected graph. As an application, we also find closed-forms for their multiplicative degree-Kirchhoff index, Kemeny's constant and number of spanning trees
Abstract. Suppose G is a simple graph. The ℓeigenvalues δ1, δ2,..., δn of G are the eigenvalues of i...
International audienceIn this work, we study the spectrum of the normalized Laplacian and its regula...
AbstractLet M denote the Laplacian matrix of a graph G. Associated with G is a finite group Φ(G), ob...
Determining and analyzing the spectra of graphs is an important and exciting research topic in mathe...
Given an arbitrary connected $G$, the $n$-polygon graph $\tau_n(G)$ is obtained by adding a path wit...
The normalized Laplacian plays an important role on studying the structure properties of non-regular...
To any graph we may associate a matrix which records information about its structure. The goal of sp...
AbstractWe investigate how the spectrum of the normalized (geometric) graph Laplacian is affected by...
AbstractWe show that, in the graph spectrum of the normalized graph Laplacian on trees, the eigenval...
The combinatorial Laplacian is an operator that has numerous applications in physics, finance, rando...
In this paper we determine the normalized Laplacian spectrum of the Q-vertex corona, Q-edge corona, ...
In this dissertation we study a problem in mathematical physics concerning the eigenvalues of random...
Let G be a simple graph of order N. The normalized Laplacian Estrada the normalized Laplacian eigenv...
In this paper we determine the full normalized Laplacian spectrum of the subdivision-vertex join, su...
WOS: 000329143500016We consider the normalized Laplacian matrix for signed graphs and derive interla...
Abstract. Suppose G is a simple graph. The ℓeigenvalues δ1, δ2,..., δn of G are the eigenvalues of i...
International audienceIn this work, we study the spectrum of the normalized Laplacian and its regula...
AbstractLet M denote the Laplacian matrix of a graph G. Associated with G is a finite group Φ(G), ob...
Determining and analyzing the spectra of graphs is an important and exciting research topic in mathe...
Given an arbitrary connected $G$, the $n$-polygon graph $\tau_n(G)$ is obtained by adding a path wit...
The normalized Laplacian plays an important role on studying the structure properties of non-regular...
To any graph we may associate a matrix which records information about its structure. The goal of sp...
AbstractWe investigate how the spectrum of the normalized (geometric) graph Laplacian is affected by...
AbstractWe show that, in the graph spectrum of the normalized graph Laplacian on trees, the eigenval...
The combinatorial Laplacian is an operator that has numerous applications in physics, finance, rando...
In this paper we determine the normalized Laplacian spectrum of the Q-vertex corona, Q-edge corona, ...
In this dissertation we study a problem in mathematical physics concerning the eigenvalues of random...
Let G be a simple graph of order N. The normalized Laplacian Estrada the normalized Laplacian eigenv...
In this paper we determine the full normalized Laplacian spectrum of the subdivision-vertex join, su...
WOS: 000329143500016We consider the normalized Laplacian matrix for signed graphs and derive interla...
Abstract. Suppose G is a simple graph. The ℓeigenvalues δ1, δ2,..., δn of G are the eigenvalues of i...
International audienceIn this work, we study the spectrum of the normalized Laplacian and its regula...
AbstractLet M denote the Laplacian matrix of a graph G. Associated with G is a finite group Φ(G), ob...