In this paper, we propose a novel entropic signature for graphs, where we probe the graphs by means of continuous-time quantum walks. More precisely, we characterise the structure of a graph through its average mixing matrix. The average mixing matrix is a doubly-stochastic matrix that encapsulates the time-averaged behaviour of a continuous-time quantum walk on the graph, i.e., the ij-th element of the average mixing matrix represents the time-averaged transition probability of a continuous-time quantum walk from the vertex vi to the vertex vj. With this matrix to hand, we can associate a probability distribution with each vertex of the graph. We define a novel entropic signature by concatenating the average Shannon entropy of these probab...
In this paper, we use the quantum Jensen-Shannon divergence as a means of measuring the information ...
We show that the (normalized) symmetric Laplacian of a simple graph can be obtained from the partial...
We develop a novel method for measuring the similarity between complete weighted graphs, which are p...
In this paper, we propose a novel entropic signature for graphs, where we probe the graphs by means ...
Laplacian-based descriptors, such as the Heat Kernel Signature and the Wave Kernel Signature, allow ...
Shannon entropy is an information-theoretic measure of unpredictability in probabilistic models. Rec...
The von Neumann entropy of a graph is a spectral complexity measure that has recently found applicat...
Claude Shannon developed the concept now known as \u27Shannon entropy\u27 as a measure of uncertaint...
We normalize the combinatorial Laplacian of a graph by the degree sum, look at its eigenvalues as a ...
We consider the continuous-time quantum walk defined on the adjacency matrix of a graph. At each ins...
One of the most fundamental problem that we face in the graph domain is that of establishing the sim...
In this thesis, we address problems encountered in complex network analysis using graph theoretic me...
In this paper we propose a quantum algorithm to measure the similarity between a pair of unattribute...
Although there are many existing alternative methods for using structural characterizations of undir...
We show that the (normalized) symmetric Laplacian of a simple graph can be obtained from the partial...
In this paper, we use the quantum Jensen-Shannon divergence as a means of measuring the information ...
We show that the (normalized) symmetric Laplacian of a simple graph can be obtained from the partial...
We develop a novel method for measuring the similarity between complete weighted graphs, which are p...
In this paper, we propose a novel entropic signature for graphs, where we probe the graphs by means ...
Laplacian-based descriptors, such as the Heat Kernel Signature and the Wave Kernel Signature, allow ...
Shannon entropy is an information-theoretic measure of unpredictability in probabilistic models. Rec...
The von Neumann entropy of a graph is a spectral complexity measure that has recently found applicat...
Claude Shannon developed the concept now known as \u27Shannon entropy\u27 as a measure of uncertaint...
We normalize the combinatorial Laplacian of a graph by the degree sum, look at its eigenvalues as a ...
We consider the continuous-time quantum walk defined on the adjacency matrix of a graph. At each ins...
One of the most fundamental problem that we face in the graph domain is that of establishing the sim...
In this thesis, we address problems encountered in complex network analysis using graph theoretic me...
In this paper we propose a quantum algorithm to measure the similarity between a pair of unattribute...
Although there are many existing alternative methods for using structural characterizations of undir...
We show that the (normalized) symmetric Laplacian of a simple graph can be obtained from the partial...
In this paper, we use the quantum Jensen-Shannon divergence as a means of measuring the information ...
We show that the (normalized) symmetric Laplacian of a simple graph can be obtained from the partial...
We develop a novel method for measuring the similarity between complete weighted graphs, which are p...