We study the phase transition in a random graph in which vertices and edges are added at constant rates. Two recent papers in Physical Review E by Callaway, Hopcroft, Kleinberg, Newman, and Strogatz, and Dorogovstev, Mendes, and Samukhin have computed the critical value of this model, shown that the fraction of vertices in finite clusters is infinitely differentiable at the critical value, and that in the subcritical phase the cluster size distribution has a polynomial decay rate with a continuously varying power. Here we sketch rigorous proofs for the first and third results and a new estimates about connectivity probabilities at the critical value
15 pages, 9 figures (color eps) [v2: published text with a new Title and addition of an appendix, a ...
Abstract We study the critical behavior of inhomogeneous random graphs where edges are present indep...
In this paper we consider random distance graphs motivated by applications in neurobiology. These mo...
The classical random graph models, in particular G(n,p), are homogeneous, in the sense that the ...
The random-cluster model of Fortuin and Kasteleyn contains as special cases the percolation, Ising, ...
We study a large-time limit of a Markov process whose states are finite graphs. The number of the ve...
In this paper we extend our previous results on the connectivity functions and pressure of the Rando...
We consider a model for random hypergraphs with identifiability, an analogue of connectedness. This ...
We study the critical behavior of inhomogeneous random graphs where edges are present independently ...
Abstract. We describe recent results, obtained in collaborations with C. Borgs, J.T. Chayes, R. van ...
We study a random graph model which is a superposition of bond percolation on Z(d) with parameter p,...
ABSTRACT: We study a random graph model which is a superposition of bond percolation on Zd with para...
International audienceGiven a weighted graph, we introduce a partition of its vertex set such that t...
International audienceThe critical surface for random-cluster model with cluster-weight q ≥ 4 on iso...
This PhD thesis deals with two different types of questions on random graph and random hypergraph st...
15 pages, 9 figures (color eps) [v2: published text with a new Title and addition of an appendix, a ...
Abstract We study the critical behavior of inhomogeneous random graphs where edges are present indep...
In this paper we consider random distance graphs motivated by applications in neurobiology. These mo...
The classical random graph models, in particular G(n,p), are homogeneous, in the sense that the ...
The random-cluster model of Fortuin and Kasteleyn contains as special cases the percolation, Ising, ...
We study a large-time limit of a Markov process whose states are finite graphs. The number of the ve...
In this paper we extend our previous results on the connectivity functions and pressure of the Rando...
We consider a model for random hypergraphs with identifiability, an analogue of connectedness. This ...
We study the critical behavior of inhomogeneous random graphs where edges are present independently ...
Abstract. We describe recent results, obtained in collaborations with C. Borgs, J.T. Chayes, R. van ...
We study a random graph model which is a superposition of bond percolation on Z(d) with parameter p,...
ABSTRACT: We study a random graph model which is a superposition of bond percolation on Zd with para...
International audienceGiven a weighted graph, we introduce a partition of its vertex set such that t...
International audienceThe critical surface for random-cluster model with cluster-weight q ≥ 4 on iso...
This PhD thesis deals with two different types of questions on random graph and random hypergraph st...
15 pages, 9 figures (color eps) [v2: published text with a new Title and addition of an appendix, a ...
Abstract We study the critical behavior of inhomogeneous random graphs where edges are present indep...
In this paper we consider random distance graphs motivated by applications in neurobiology. These mo...