Statistical properties of avalanches via the c-record process

Abstract

We study the statistics of avalanches, as a response to an applied force, undergone by a particle hopping on a one dimensional lattice where the pinning forces at each site are independent and identically distributed (I.I.D), each drawn from a continuous f(x). The avalanches in this model correspond to the inter-record intervals in a modified record process of I.I.D variables, defined by a single parameter c>0. This parameter characterizes the record formation via the recursive process Rk > Rk-1-c, where Rk denotes the value of the k-th record. We show that for c>0, if f(x) decays slower than an exponential for large x, the record process is nonstationary as in the standard c=0 case. In contrast, if f(x) has a faster than exponential tail, the record process becomes stationary and the avalanche size distribution π(n) has a decay faster than 1/n2 for large n. The marginal case where f(x) decays exponentially for large x exhibits a phase transition from a non-stationary phase to a stationary phase as c increases through a critical value c crit. Focusing on f(x)=e-x (with x 0), we show that c crit=1 and for c<1, the record statistics is non-stationary. However, for c>1, the record statistics is stationary with avalanche size distribution π(n) n-1-λ(c) for large n. Consequently, for c>1, the mean number of records up to N steps grows algebraically Nλ(c) for large N. Remarkably, the exponent λ(c) depends continously on c for c>1 and is given by the unique positive root of c=- (1-λ)/λ. We also unveil the presence of nontrivial correlations between avalanches in the stationary phase that resemble earthquake sequences.

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