We prove a new lower bound on the critical density ρc of the hard disk model, i.e., the density below which it is possible to efficiently sample random configurations of n non-overlapping disks in a unit torus. We use a classic Markov chain which moves one disk at a time, but with an improved path coupling analysis. Our main tool is an optimized metric on neighboring pairs of configurations, i.e., configurations that differ in the position of a single disk: we define a metric that depends on the difference in these positions, and which approaches zero continuously as they coincide. This improves the previous lower bound ρc ≥ 1/8 to ρc ≥ 0.154.
Dilatancy is numerically determined for a two-dimensional disk packing with a uniform radius distrib...
We establish the global lower mass-bound property for the largest connected components in the critic...
We discuss various critical densities in sandpile models. The sta-tionary density is the average exp...
We introduce an algorithmic framework for tuning the spatial density of disks in a maximal random pa...
We improve upon all known lower bounds on the critical fugacity and critical density of the hard sph...
We propose locally stable sparse hard-disk packings, as introduced by B\"or\"oczky, as a model for t...
The most dense random packings of binary assemblies of hard disks in the plane are considered for th...
We investigate how the densities of inherent structures, which we refer to as the closest jammed con...
We provide a new upper bound for the critical density of Activated Random Walk in case of biased dis...
Let each of n particles starting at the origin in Z2 perform simple random walk until reaching a sit...
We consider a class of partial mass problems in which a fraction of the mass of a probability measur...
We provide a tight result for a fundamental problem arising from packing disks into a circular conta...
Abstract: Hard disks systems are often considered as prototypes for simple fluids. In a statistical ...
Let X1n,...,X>nn denote the locations of n points in a bounded, [gamma]-dimensional, Euclidean regio...
We establish the global lower mass-bound property for the largest connected components in the critic...
Dilatancy is numerically determined for a two-dimensional disk packing with a uniform radius distrib...
We establish the global lower mass-bound property for the largest connected components in the critic...
We discuss various critical densities in sandpile models. The sta-tionary density is the average exp...
We introduce an algorithmic framework for tuning the spatial density of disks in a maximal random pa...
We improve upon all known lower bounds on the critical fugacity and critical density of the hard sph...
We propose locally stable sparse hard-disk packings, as introduced by B\"or\"oczky, as a model for t...
The most dense random packings of binary assemblies of hard disks in the plane are considered for th...
We investigate how the densities of inherent structures, which we refer to as the closest jammed con...
We provide a new upper bound for the critical density of Activated Random Walk in case of biased dis...
Let each of n particles starting at the origin in Z2 perform simple random walk until reaching a sit...
We consider a class of partial mass problems in which a fraction of the mass of a probability measur...
We provide a tight result for a fundamental problem arising from packing disks into a circular conta...
Abstract: Hard disks systems are often considered as prototypes for simple fluids. In a statistical ...
Let X1n,...,X>nn denote the locations of n points in a bounded, [gamma]-dimensional, Euclidean regio...
We establish the global lower mass-bound property for the largest connected components in the critic...
Dilatancy is numerically determined for a two-dimensional disk packing with a uniform radius distrib...
We establish the global lower mass-bound property for the largest connected components in the critic...
We discuss various critical densities in sandpile models. The sta-tionary density is the average exp...