Monday, July 2, 2012

1104.3397 (Lasse Leskelä et al.)

Juggler's exclusion process    [PDF]

Lasse Leskelä, Harri Varpanen
Juggler's exclusion process describes a system of particles on the positive integers where particles drift down to zero at unit speed. After a particle hits zero, it jumps into a randomly chosen unoccupied site. We model the system as a set-valued Markov process and show that the process is ergodic if the family of jump height distributions is uniformly integrable. In a special case where the particles jump according to a set-avoiding memoryless distribution, the process reaches its equilibrium in finite nonrandom time, and the equilibrium distribution can be represented as a Gibbs measure conforming to a linear gravitational potential.
View original: http://arxiv.org/abs/1104.3397

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