We consider the contact process on the model of hyperbolic random graph, in the regime when the degree distribution obeys a power law with exponent χ ( 1, 2 ) (so that the degree distribution has finite mean and infinite second moment). We show that the probability of nonextinction as the rate of infection goes to zero decays as a power law with an exponent that only depends on χ and which is the same as in the configuration model, suggesting some universality of this critical exponent. We also consider finite versions of the hyperbolic graph and prove metastability results, as the size of the graph goes to infinity.</p
We find scaling limits for the sizes of the largest components at criticality for rank-1 inhomogeneo...
We construct graphs (trees of bounded degree) on which the contact process has critical rate (which ...
We survey the recent work on phase transition and distances in various random graph models with gene...
We consider the contact process on the model of hyperbolic random graph, in the regime when the degr...
International audienceWe consider the contact process on the model of hyperbolic random graph, in th...
We consider the contact process on the model of hyperbolic random graph, in the regime when the degr...
Proposition 6.2 replaced by a weaker version (after a gap in its proof was mentioned to us by Daniel...
In this thesis, we discuss some aspects of both finite-volume and infinite-volume phase transitions ...
We consider the contact process on a random graph with a fixed degree distribution given by a power ...
We consider the contact process with infection rate lambda on a random (d + 1)-regular graph with n ...
We derive the most basic dynamical properties of random hyperbolic graphs (the distributions of con...
We investigate the contact process on random graphs generated from the configuration model for scale...
We find scaling limits for the sizes of the largest components at criticality for rank-1 inhomogeneo...
We construct graphs (trees of bounded degree) on which the contact process has critical rate (which ...
We survey the recent work on phase transition and distances in various random graph models with gene...
We consider the contact process on the model of hyperbolic random graph, in the regime when the degr...
International audienceWe consider the contact process on the model of hyperbolic random graph, in th...
We consider the contact process on the model of hyperbolic random graph, in the regime when the degr...
Proposition 6.2 replaced by a weaker version (after a gap in its proof was mentioned to us by Daniel...
In this thesis, we discuss some aspects of both finite-volume and infinite-volume phase transitions ...
We consider the contact process on a random graph with a fixed degree distribution given by a power ...
We consider the contact process with infection rate lambda on a random (d + 1)-regular graph with n ...
We derive the most basic dynamical properties of random hyperbolic graphs (the distributions of con...
We investigate the contact process on random graphs generated from the configuration model for scale...
We find scaling limits for the sizes of the largest components at criticality for rank-1 inhomogeneo...
We construct graphs (trees of bounded degree) on which the contact process has critical rate (which ...
We survey the recent work on phase transition and distances in various random graph models with gene...