We prove that the Poisson Boolean model, also known as the Gilbert disc model, is noise sensitive at criticality. This is the first such result for a Continuum Percolation model, and the first which involves a percolation model with critical probability pc not equal 1/2. Our proof uses a version of the Benjamini-Kalai-Schramm Theorem for biased product measures. A quantitative version of this result was recently proved by Keller and Kindler. We give a simple deduction of the non-quantitative result from the unbiased version. We also develop a quite general method of approximating Continuum Percolation models by discrete models with pc bounded away from zero; this method is based on an extremal result on non-uniform hypergraphs
We consider the Poisson Boolean percolation model in R2, where the radius of each ball is independen...
26 pages, 1 figureIn [AGMT16], Ahlberg, Griffiths, Morris and Tassion prove that, asymptotically alm...
We prove Tsirelson's conjecture that the scaling limit of planar critical percolation is a black noi...
We prove that the Poisson Boolean model, also known as the Gilbert disc model, is noise sensitive at...
This is a graduate-level introduction to the theory of Boolean functions, an exciting area lying on ...
International audienceThis is a graduate-level introduction to the theory of Boolean functions, an e...
Recently the study of noise sensitivity and noise stability of Boolean functions has received consid...
Recently the study of noise sensitivity and noise stability of Boolean functions has received consid...
This thesis combines the study of asymptotic properties of percolation processes with various dynami...
The main purpose of this paper is to introduce and establish basic results of a natural extension of...
We prove nontrivial phase transitions for continuum percolation in a Boolean model based on a Cox po...
We consider the Poisson Boolean model of continuum percolation on a homogeneous space M. Let lambda ...
In 1961 Gilbert defined a model of continuum percolation in which points are placed in the plane acc...
International audienceWe show that simple, stationary point processes of a given intensity on $\mR^d...
We consider the Poisson Boolean model of percolation where the percolating shapes are convex regions...
We consider the Poisson Boolean percolation model in R2, where the radius of each ball is independen...
26 pages, 1 figureIn [AGMT16], Ahlberg, Griffiths, Morris and Tassion prove that, asymptotically alm...
We prove Tsirelson's conjecture that the scaling limit of planar critical percolation is a black noi...
We prove that the Poisson Boolean model, also known as the Gilbert disc model, is noise sensitive at...
This is a graduate-level introduction to the theory of Boolean functions, an exciting area lying on ...
International audienceThis is a graduate-level introduction to the theory of Boolean functions, an e...
Recently the study of noise sensitivity and noise stability of Boolean functions has received consid...
Recently the study of noise sensitivity and noise stability of Boolean functions has received consid...
This thesis combines the study of asymptotic properties of percolation processes with various dynami...
The main purpose of this paper is to introduce and establish basic results of a natural extension of...
We prove nontrivial phase transitions for continuum percolation in a Boolean model based on a Cox po...
We consider the Poisson Boolean model of continuum percolation on a homogeneous space M. Let lambda ...
In 1961 Gilbert defined a model of continuum percolation in which points are placed in the plane acc...
International audienceWe show that simple, stationary point processes of a given intensity on $\mR^d...
We consider the Poisson Boolean model of percolation where the percolating shapes are convex regions...
We consider the Poisson Boolean percolation model in R2, where the radius of each ball is independen...
26 pages, 1 figureIn [AGMT16], Ahlberg, Griffiths, Morris and Tassion prove that, asymptotically alm...
We prove Tsirelson's conjecture that the scaling limit of planar critical percolation is a black noi...