On the distribution of the free path length of the linear flow in a honeycomb

Boca, Florin P.; Gologan, Radu N.

doi:10.5802/aif.2457

On the distribution of the free path length of the linear flow in a honeycomb
[Sur la distribution du temps de sortie pour le flot linéaire dans un réseau hexagonal]

Boca, Florin P.¹ ; Gologan, Radu N.²

¹ University of Illinois at Urbana-Champaign Department of Mathematics 1409 W. Green St. Urbana, IL 61801 (USA)
² Institute of Mathematics of the Romanian Academy P.O.Box 1-764 Bucharest 014700 (Romania)

Annales de l'Institut Fourier, Tome 59 (2009) no. 3, pp. 1043-1075.

Résumé
Abstract

Nous considérons la région obtenue en enlevant de $ℝ^{2}$ les disques de rayon $ε$ , centrés aux points de coordonnées entières $(a, b)$ avec $b ≢ a (mod ℓ)$ . Nous étudions la répartition de la longueur du libre parcours (temps de sortie) $τ_{ℓ, ε} (ω)$ d’une particule ponctuelle, partant de $(0, 0)$ sur une trajectoire rectiligne de direction $ω$ quand $ε \to 0^{+}$ . Pour tout nombre entier $ℓ \geq 2$ , on montre la convergence faible des mesures de probabilité attachées aux variables aléatoires $ε τ_{ℓ, ε}$ , en calculant la distribution limite d’une manière explicite. Pour $ℓ = 3$ , respectivement $ℓ = 2$ , ce résultat mène à des formules asymptotiques pour le temps de sortie d’un billard avec des poches de rayon $ε \to 0^{+}$ centrés aux coins dans un hexagone régulier, respectivement dans un carré.

Consider the region obtained by removing from $ℝ^{2}$ the discs of radius $ε$ , centered at the points of integer coordinates $(a, b)$ with $b ≢ a (mod ℓ)$ . We are interested in the distribution of the free path length (exit time) $τ_{ℓ, ε} (ω)$ of a point particle, moving from $(0, 0)$ along a linear trajectory of direction $ω$ , as $ε \to 0^{+}$ . For every integer number $ℓ \geq 2$ , we prove the weak convergence of the probability measures associated with the random variables $ε τ_{ℓ, ε}$ , explicitly computing the limiting distribution. For $ℓ = 3$ , respectively $ℓ = 2$ , this result leads to asymptotic formulas for the exit time of a billiard with pockets of radius $ε \to 0^{+}$ centered at the corners and trajectory starting at the center in a regular hexagon, respectively in a square.

MR Zbl

DOI : 10.5802/aif.2457

Classification : 11P21, 37D50, 82C40
Keywords: Periodic Lorentz gas, linear flow, Farey fractions, honeycomb lattice
Mot clés : Gaz de Lorentz périodique, flot linéaire, suite de Farey, réseau hexagonal

Affiliations des auteurs :

Boca, Florin P. ¹ ; Gologan, Radu N. ²

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Boca, Florin P.; Gologan, Radu N. On the distribution of the free path length of the linear flow in a honeycomb. Annales de l'Institut Fourier, Tome 59 (2009) no. 3, pp. 1043-1075. doi : 10.5802/aif.2457. http://archive.numdam.org/articles/10.5802/aif.2457/

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