Add to ORKGThere exists a Lipschitz embedding of a d-dimensional comb graph (consisting of infinitely many parallel copies of Z^{d-1} joined by a perpendicular copy) into the open set of site percolation on Z^d, whenever the parameter p is close enough to 1 or the Lipschitz constant is sufficiently large. This is proved using several new results and techniques involving stochastic domination, in contexts that include a process of independent overlapping intervals on Z, and first-passage percolation on general graphs
We study the two most common types of percolation process on a sparse random graph with a given degr...
Abstract We characterize the existence of certain geometric configurations in the fractal percolati...
We construct a nearest-neighbor process {Sn} on Z that is less predictable than simple random walk, ...
There exists a Lipschitz embedding of a d-dimensional comb graph (consisting of infinitely many para...
More than twenty years ago Peter Winkler introduced a fascinating class of dependent or “co-ordinate...
We prove the existence of a (random) Lipschitz function F : Z(d-1) -> Z(+) such that, for every x is...
In this note we discuss “vacant set level set” percolation on a transient weighted graph. It interpo...
10 pagesIn this paper, we consider Bernoulli percolation on a locally finite, transitive and infinit...
Derenyi, Palla and Vicsek introduced the following dependent percolation model, in the context of fi...
AbstractWe first define site- and bond-percolation models on a general graph. We underline the link ...
Let pc(d) be the critical probability for percolation in Z d. In this paper it is shown that limd→ ∞...
Given ω ≥ 1, ℤω2 be the graph with vertex set ℤ2 in which two vertices are joined if they agree in o...
We prove for the contact process on $Z^d$, and many other graphs, that the upper invariantmeasure do...
Equip each point x of a homogeneous Poisson process P on R with Dx edge stubs, where the Dx are i.i....
We consider continuous-time random interlacements on Zd, d ≥ 3, and investigate the percolation mode...
We study the two most common types of percolation process on a sparse random graph with a given degr...
Abstract We characterize the existence of certain geometric configurations in the fractal percolati...
We construct a nearest-neighbor process {Sn} on Z that is less predictable than simple random walk, ...
There exists a Lipschitz embedding of a d-dimensional comb graph (consisting of infinitely many para...
More than twenty years ago Peter Winkler introduced a fascinating class of dependent or “co-ordinate...
We prove the existence of a (random) Lipschitz function F : Z(d-1) -> Z(+) such that, for every x is...
In this note we discuss “vacant set level set” percolation on a transient weighted graph. It interpo...
10 pagesIn this paper, we consider Bernoulli percolation on a locally finite, transitive and infinit...
Derenyi, Palla and Vicsek introduced the following dependent percolation model, in the context of fi...
AbstractWe first define site- and bond-percolation models on a general graph. We underline the link ...
Let pc(d) be the critical probability for percolation in Z d. In this paper it is shown that limd→ ∞...
Given ω ≥ 1, ℤω2 be the graph with vertex set ℤ2 in which two vertices are joined if they agree in o...
We prove for the contact process on $Z^d$, and many other graphs, that the upper invariantmeasure do...
Equip each point x of a homogeneous Poisson process P on R with Dx edge stubs, where the Dx are i.i....
We consider continuous-time random interlacements on Zd, d ≥ 3, and investigate the percolation mode...
We study the two most common types of percolation process on a sparse random graph with a given degr...
Abstract We characterize the existence of certain geometric configurations in the fractal percolati...
We construct a nearest-neighbor process {Sn} on Z that is less predictable than simple random walk, ...