The aim of this Ph. D. thesis is to study several probabilistic models linking the random walks and the random trees arising from critical branching processes.In the first part, we consider the model of random walk taking values in a Euclidean lattice and indexed by a critical Galton–Watson tree conditioned by the total progeny. Under some assumptions on the critical offspring distribution and the centered jump distribution, we obtain, in all dimensions, the asymptotic growth rate of the range of this random walk, when the size of the tree tends to infinity. These results also allow us to describe the asymptotic behavior of the range of a branching random walk, when the size of the initial population goes to infinity. In parallel, we treat ...
We study the behavior of branching process in a random environment on trees in the critical, subcrit...
This thesis concerns critical branching random walks. We focus on supercritical (d ≥ 5 or higher) an...
Recent investigations have demonstrated that continuous-time branching random walks on multidimensio...
The aim of this Ph. D. thesis is to study several probabilistic models linking the random walks and ...
L’objet de cette thèse est d’étudier plusieurs modèles probabilistes reliant les marches aléatoires ...
Looptrees have recently arisen in the study of critical percolation on the uniform infinite planar t...
pages 466-513International audienceIn this paper we consider a random walk in random environment on ...
The purpose of this thesis is to study random walks on “decorated” Galton-Watson trees with critical...
The subject of this thesis is the study of various models of random walks on random trees, with an e...
This thesis is at the interface between combinatorics and probability,and contributes to the study o...
We compute almost surely (simultaneaously) the Hausdorff dimensions of the sets of infinite branches...
In this thesis, we are interested in random walks random walks on Galton-Watson trees and tree-index...
Let T be a supercritical Galton–Watson tree with a bounded offspring distribution that has mean μ> 1...
In this thesis we study random walks in random environments, a major area in Probability theory. Wit...
This thesis deals with two models of random walks. The first model belongs to the family of random w...
We study the behavior of branching process in a random environment on trees in the critical, subcrit...
This thesis concerns critical branching random walks. We focus on supercritical (d ≥ 5 or higher) an...
Recent investigations have demonstrated that continuous-time branching random walks on multidimensio...
The aim of this Ph. D. thesis is to study several probabilistic models linking the random walks and ...
L’objet de cette thèse est d’étudier plusieurs modèles probabilistes reliant les marches aléatoires ...
Looptrees have recently arisen in the study of critical percolation on the uniform infinite planar t...
pages 466-513International audienceIn this paper we consider a random walk in random environment on ...
The purpose of this thesis is to study random walks on “decorated” Galton-Watson trees with critical...
The subject of this thesis is the study of various models of random walks on random trees, with an e...
This thesis is at the interface between combinatorics and probability,and contributes to the study o...
We compute almost surely (simultaneaously) the Hausdorff dimensions of the sets of infinite branches...
In this thesis, we are interested in random walks random walks on Galton-Watson trees and tree-index...
Let T be a supercritical Galton–Watson tree with a bounded offspring distribution that has mean μ> 1...
In this thesis we study random walks in random environments, a major area in Probability theory. Wit...
This thesis deals with two models of random walks. The first model belongs to the family of random w...
We study the behavior of branching process in a random environment on trees in the critical, subcrit...
This thesis concerns critical branching random walks. We focus on supercritical (d ≥ 5 or higher) an...
Recent investigations have demonstrated that continuous-time branching random walks on multidimensio...