Probability distribution of residence times of grains in models of ricepiles

Abstract

We study the probability distribution of residence time of a grain at a site, and its total residence time inside a pile, in different ricepile models. The tails of these distributions are dominated by the grains that get deeply buried in the pile. We show that, for a pile of size L, the probabilities that the residence time at a site or the total residence time is greater than t, both decay as 1/t( t)x for Lω t (Lγ) where γ is an exponent 1, and values of x and ω in the two cases are different. In the Oslo ricepile model we find that the probability that the residence time Ti at a site i being greater than or equal to t, is a non-monotonic function of L for a fixed t and does not obey simple scaling. For model in d dimensions, we show that the probability of minimum slope configuration in the steady state, for large L, varies as (- Ld+2) where is a constant, and hence γ = d+2.

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