We consider the billiard dynamics in a striplike set that is tessellated by countably many translated copies of the same polygon. A random configuration of semidispersing scatterers is placed in each copy. The ensemble of dynamical systems thus defined, one for each global choice of scatterers, is called `quenched random Lorentz tube'. We prove that under general conditions, almost every system in the ensemble is recurrent.

Cristadoro, G., Lenci, M., Seri, M. (2010). Recurrence for quenched random Lorentz tubes. CHAOS, 20(2), 023115-1-023115-7 [10.1063/1.3405290].

Recurrence for quenched random Lorentz tubes

Cristadoro, G;
2010

Abstract

We consider the billiard dynamics in a striplike set that is tessellated by countably many translated copies of the same polygon. A random configuration of semidispersing scatterers is placed in each copy. The ensemble of dynamical systems thus defined, one for each global choice of scatterers, is called `quenched random Lorentz tube'. We prove that under general conditions, almost every system in the ensemble is recurrent.
Articolo in rivista - Articolo scientifico
Billiards; Quenched Random Dynamical Systems; Infinite Ergodic Theory; Lorentz Gas; Cocycles;
English
2010
20
2
023115-1
023115-7
011002CHA
reserved
Cristadoro, G., Lenci, M., Seri, M. (2010). Recurrence for quenched random Lorentz tubes. CHAOS, 20(2), 023115-1-023115-7 [10.1063/1.3405290].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/185947
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