Sourish Bondyopadhyay, P. K. Mohanty
We introduce a chipping model in one dimensional periodic lattice with
continuous mass. The model evolves following a parallel or random sequential
dynamics where a fixed fraction of the mass of any site is distributed randomly
among the departure site and its neighbors, and the remaining mass sticks to
the site. We have calculated the steady state mass distribution of the model
perturbatively for both symmetric and asymmetric mass-transfer. In most cases,
the product measure turns out to be a good approximation.
View original:
http://arxiv.org/abs/1202.4643
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