Abstract
We study stochastic billiards on general tables: a particle moves according to its constant velocity inside some domain \(\fancyscript{D}\subset {\mathbb{R}}^d\) until it hits the boundary and bounces randomly inside, according to some reflection law. We assume that the boundary of the domain is locally Lipschitz and almost everywhere continuously differentiable. The angle of the outgoing velocity with the inner normal vector has a specified, absolutely continuous density. We construct the discrete time and the continuous time processes recording the sequence of hitting points on the boundary and the pair location/velocity. We mainly focus on the case of bounded domains. Then, we prove exponential ergodicity of these two Markov processes, we study their invariant distribution and their normal (Gaussian) fluctuations. Of particular interest is the case of the cosine reflection law: the stationary distributions for the two processes are uniform in this case, the discrete time chain is reversible though the continuous time process is quasi-reversible. Also in this case, we give a natural construction of a chord “picked at random” in \(\fancyscript{D}\) , and we study the angle of intersection of the process with a (d − 1)-dimensional manifold contained in \(\fancyscript{D}\) .
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Bardos C., Golse F., Colonna J.-F. (1997) Diffusion approximation and hyperbolic automorphisms of the torus. Phys. D 104(1): 32–60
Billingsley P. (1995) Probability and Measure. Wiley, New York
Boatto S., Golse F. (2002) Diffusion approximation of a Knudsen gas model: dependence of the diffusion constant upon the boundary condition. Asymptot. Anal. 31(2): 93–111
Borovkov K.A. (1991) On a new variant of the Monte Carlo method. Theory Probab. Appl. 36, 355–360
Borovkov K.A. (1994) On simulation of random vectors with given densities in regions and on their boundaries. J. Appl. Probab. 31(1): 205–220
Brzank A., Schütz G.M. (2006) Amplification of molecular traffic control in catalytic grains with novel channel topology design. J. Chem. Phys. 124, 214701
Caprino S., Pulvirenti M. (1996) The Boltzmann–Grad limit for a one-dimensional Boltzmann equation in a stationary state. Commun. Math. Phys. 177(1): 63–81
Cercignani C. (1988) The Boltzmann Equation and its Applications. Springer, New York
Coppens M.-O., Dammers A.J. (2006) Effects of heterogeneity on diffusion in nanopores. From inorganic materials to protein crystals and ion channels. Fluid Phase Equilib. 241(1–2): 308–316
Coppens M.-O., Malek K. (2003) Dynamic Monte-Carlo simulations of diffusion limited reactions in rough nanopores. Chem. Eng. Sci. 58(21): 4787–4795
Evans S.N. (2001) Stochastic billiards on general tables. Ann. Appl. Probab. 11(2): 419–437
Federer H. (1969) Geometric Measure Theory. Springer, New York
Feres R., Yablonsky G. (2004) Knudsen’s cosine law and random billiards. Chem. Eng. Sci. 59, 1541–1556
Feres, R.: Random Walks Derived from Billiards. Preprint, 2006
Goldstein S., Kipnis C., Ianiro N. (1985) Stationary states for a mechanical system with stochastic boundary conditions. J. Statist. Phys. 41(5–6): 915–939
Jaynes E.T. (1973) The well-posed problem. Found. Phys. 3, 477–493
Keil F.J., Krishna R., Coppens M.-O. (2000) Modeling of diffusion in zeolites. Rev. Chem. Eng. 16, 71
Knudsen M. (1952) Kinetic Theory of Gases—Some Modern Aspects. Methuen’s Monographs on Physical Subjects, London
Lalley S., Robbins H. (1988) Stochastic search in a convex region. Probab. Theory Relat. Fields 77, 99–116
Lalley S., Robbins H. (1987) Asymptotically minimax stochastic search strategies in the plane. Proc. Nat. Acad. Sci. USA 84, 2111–2112
Malek K., Coppens M.-O. (2001) Effects of surface roughness on self- and transport diffusion in porous media in the Knudsen regime. Phys. Rev. Lett. 87, 125505
Meyn S.P., Tweedie R.L. (1993) Markov Chains and Stochastic Stability. Springer, Berlin
Morgan F. (1988) Geometric Measure. Theory A beginners guide. Academic Press, San Diego
Roberts A.W., Varberg D.E. (1973) Convex Functions. Academic Press, New York
Romeijn H.E. (1998) A general framework for approximate sampling with an application to generating points on the boundary of bounded convex regions. Statistica Neerlandica 52(1): 42–59
Russ S., Zschiegner S., Bunde A., Kärger J. Lambert diffusion in porous media in the Knudsen regime: equivalence of self- and transport diffusion. Phys. Rev. E 72 030101(R) (2005)
Stoyan D., Kendall W.S., Mecke J. (1987) Stochastic Geometry and its Applications. Wiley, Chichester
Thorisson H. (2000) Coupling, Stationarity, and Regeneration. Springer, Berlin
Author information
Authors and Affiliations
Corresponding author
Additional information
Communicated by J. Fritz
Rights and permissions
About this article
Cite this article
Comets, F., Popov, S., Schütz, G.M. et al. Billiards in a General Domain with Random Reflections. Arch Rational Mech Anal 191, 497–537 (2009). https://doi.org/10.1007/s00205-008-0120-x
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s00205-008-0120-x