We consider a nonlinear vertex-reinforced jump process (VRJP(w)) on Z with an increasing measurable weight function w : [1, ∞) → [1, ∞) and initial weights equal to one. Our main goal is to study the asymptotic behaviour of VRJP(w) depending on the integrability of the reciprocal of w. In particular, we prove that if (Equation presented). then the process is recurrent, that is, it visits each vertex infinitely often and all local times are unbounded. On the other hand, if (Equation presented). and there exists a ρ > 0 such that (Equation presented). du is nonincreasing then the process will eventually get stuck on exactly three w(u) vertices, and there is only one vertex with unbounded local time. We also show that if the initial weights ar...
We prove the vertex-reinforced jump process (VRJP) is recurrent in two dimensions for any translatio...
In this paper, we focus on the scaling-limit of the random potential $\beta$ associated with the Ver...
Vertex-reinforced random walk (VRRW), defined by Pemantle in 1988, is a random process that takes va...
We introduce a non-reversible generalization of the Vertex-Reinforced Jump Process (VRJP), which we ...
We study the asymptotic behaviour of the martingale (ψ n (o)) n∈N associated with the Vertex Reinfor...
Reinforced random walks are processes whose future behavior is influenced by their history. A reinfo...
37 pagesInternational audienceThis paper concerns the Vertex reinforced jump process (VRJP), the Edg...
Consider a vertex-reinforced jump process defined on a regular tree, where each vertex has exactly b...
14 pages, 3 figures.International audienceWe prove that the only nearest neighbor jump process with ...
Authors' version. 26 pages, 1 figure. Originally called "Scaling limit of the VRJP in dimension one ...
Abstract. Edge-reinforced random walk (ERRW), introduced by Coppersmith and Diaconis in 1986 [5], is...
18 pagesInternational audienceEdge-reinforced random walk (ERRW), introduced by Coppersmith and Diac...
Reinforced random walk (RRW) is a broad class of processes which jump between nearest neighbor verti...
In this paper, we introduce a new simple but powerful general technique for the study of edge- and v...
Vertex-reinforced random walk (VRRW), defined by Pemantle in 1988, is a random process that takes va...
We prove the vertex-reinforced jump process (VRJP) is recurrent in two dimensions for any translatio...
In this paper, we focus on the scaling-limit of the random potential $\beta$ associated with the Ver...
Vertex-reinforced random walk (VRRW), defined by Pemantle in 1988, is a random process that takes va...
We introduce a non-reversible generalization of the Vertex-Reinforced Jump Process (VRJP), which we ...
We study the asymptotic behaviour of the martingale (ψ n (o)) n∈N associated with the Vertex Reinfor...
Reinforced random walks are processes whose future behavior is influenced by their history. A reinfo...
37 pagesInternational audienceThis paper concerns the Vertex reinforced jump process (VRJP), the Edg...
Consider a vertex-reinforced jump process defined on a regular tree, where each vertex has exactly b...
14 pages, 3 figures.International audienceWe prove that the only nearest neighbor jump process with ...
Authors' version. 26 pages, 1 figure. Originally called "Scaling limit of the VRJP in dimension one ...
Abstract. Edge-reinforced random walk (ERRW), introduced by Coppersmith and Diaconis in 1986 [5], is...
18 pagesInternational audienceEdge-reinforced random walk (ERRW), introduced by Coppersmith and Diac...
Reinforced random walk (RRW) is a broad class of processes which jump between nearest neighbor verti...
In this paper, we introduce a new simple but powerful general technique for the study of edge- and v...
Vertex-reinforced random walk (VRRW), defined by Pemantle in 1988, is a random process that takes va...
We prove the vertex-reinforced jump process (VRJP) is recurrent in two dimensions for any translatio...
In this paper, we focus on the scaling-limit of the random potential $\beta$ associated with the Ver...
Vertex-reinforced random walk (VRRW), defined by Pemantle in 1988, is a random process that takes va...