The degree variance has been proposed for many years to study the topology of a network. It can be used to assess the goodness-of-fit of the Erdös-Renyi model. In this paper, we prove the asymptotic normality of the degree variance under this model which enables us to derive a formal test. We generalize this result to the heterogeneous Erdös-Renyi model in which the edges have different respective probabilities to exist. For both models we study the power of the proposed goodness-of-fit test. We also prove the asymptotic normality under specific sparsity regimes. Both tests are illustrated on real networks from social sciences and ecology. Their performances are assessed via a simulation study
In this article, we explicitly derive the limiting degree distribution of the shortest path tree fro...
Panel A shows the degree statistics (mean and variance) for 1000 beta networks of size N = 200 for e...
In this paper we study typical distances in random graphs with i.i.d. degrees of which the tail of t...
The degree variance has been proposed for many years to study the topology of a network. It can be u...
International audienceThe degrees are a classical and relevant way to study the topology of a networ...
The Erd\"os Renyi graph is a popular choice to model network data as it is parsimoniously parametriz...
In order to understand how the network structure impacts the underlying dynamics, we seek an assortm...
Directed networks are conveniently represented as graphs in which ordered edges encode interactions ...
Despite degree distributions give some insights about how heterogeneous a network is, they fail in g...
To capture the heterozygosity of vertex degrees of networks and understand their distributions, a cl...
In the paper there are considered random graphs of Internet-type, i.e. graph node degrees are drawn ...
Bipartite networks are a natural representation of the interactions between entities from two differ...
We propose and analyse a novel nonparametric goodness-of-fit testing procedure for exchangeable expo...
Abstract—Estimating characteristics of large graphs via sampling is vital in the study of complex ne...
Random graphs are statistical models that have many applications, ranging from neuroscience to socia...
In this article, we explicitly derive the limiting degree distribution of the shortest path tree fro...
Panel A shows the degree statistics (mean and variance) for 1000 beta networks of size N = 200 for e...
In this paper we study typical distances in random graphs with i.i.d. degrees of which the tail of t...
The degree variance has been proposed for many years to study the topology of a network. It can be u...
International audienceThe degrees are a classical and relevant way to study the topology of a networ...
The Erd\"os Renyi graph is a popular choice to model network data as it is parsimoniously parametriz...
In order to understand how the network structure impacts the underlying dynamics, we seek an assortm...
Directed networks are conveniently represented as graphs in which ordered edges encode interactions ...
Despite degree distributions give some insights about how heterogeneous a network is, they fail in g...
To capture the heterozygosity of vertex degrees of networks and understand their distributions, a cl...
In the paper there are considered random graphs of Internet-type, i.e. graph node degrees are drawn ...
Bipartite networks are a natural representation of the interactions between entities from two differ...
We propose and analyse a novel nonparametric goodness-of-fit testing procedure for exchangeable expo...
Abstract—Estimating characteristics of large graphs via sampling is vital in the study of complex ne...
Random graphs are statistical models that have many applications, ranging from neuroscience to socia...
In this article, we explicitly derive the limiting degree distribution of the shortest path tree fro...
Panel A shows the degree statistics (mean and variance) for 1000 beta networks of size N = 200 for e...
In this paper we study typical distances in random graphs with i.i.d. degrees of which the tail of t...
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