Saved in:
Bibliographic Details
Main Authors: Palmer, Matthew, Strömbergsson, Andreas
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2304.05458
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866916452391452672
author Palmer, Matthew
Strömbergsson, Andreas
author_facet Palmer, Matthew
Strömbergsson, Andreas
contents The Lorentz gas describes an ensemble of noninteracting point particles in an infinite array of spherical scatterers. In the present paper we consider the case when the scatterer configuration P is a fixed union of (translated) lattices in R^d, and prove that in the limit of low scatterer density, the particle dynamics converges to a random flight process. In the special case when the lattices in P are pairwise incommensurable, this settles a conjecture from [20]. The proof is carried out by applying a framework developed in recent work by Marklof and Strömbergsson [21], and central parts of our proof are the construction of an admissible marking of the point set P, and the verification of the uniform spherical equidistribution condition required in [21]. Regarding the random flight process obtained in the low density limit of the Lorentz gas, we prove that it can be reconstructed from the corresponding limiting flight processes arising from the individual commensurability classes of lattices in P. We furthermore prove that the free path lengths of the limit flight process have a distribution with a power law tail, whose exponent depends on the number of commensurability classes in P.
format Preprint
id arxiv_https___arxiv_org_abs_2304_05458
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle The Boltzmann-Grad Limit of the Lorentz Gas in a Union of Lattices
Palmer, Matthew
Strömbergsson, Andreas
Dynamical Systems
Mathematical Physics
Probability
82C40, 37A60, 37D50, 11H06
The Lorentz gas describes an ensemble of noninteracting point particles in an infinite array of spherical scatterers. In the present paper we consider the case when the scatterer configuration P is a fixed union of (translated) lattices in R^d, and prove that in the limit of low scatterer density, the particle dynamics converges to a random flight process. In the special case when the lattices in P are pairwise incommensurable, this settles a conjecture from [20]. The proof is carried out by applying a framework developed in recent work by Marklof and Strömbergsson [21], and central parts of our proof are the construction of an admissible marking of the point set P, and the verification of the uniform spherical equidistribution condition required in [21]. Regarding the random flight process obtained in the low density limit of the Lorentz gas, we prove that it can be reconstructed from the corresponding limiting flight processes arising from the individual commensurability classes of lattices in P. We furthermore prove that the free path lengths of the limit flight process have a distribution with a power law tail, whose exponent depends on the number of commensurability classes in P.
title The Boltzmann-Grad Limit of the Lorentz Gas in a Union of Lattices
topic Dynamical Systems
Mathematical Physics
Probability
82C40, 37A60, 37D50, 11H06
url https://arxiv.org/abs/2304.05458