SOC IN A CLASS OF SANDPILE MODELS WITH STOCHASTIC DYNAMICS

Abstract

We have studied one-dimensional cellular automata with updating rules depending stochastically on the difference of the heights of neighboring cells. The probability for toppling depends on a parameter λ which goes to one with increasing slope, i.e., the dynamics can be varied continuously. We have investigated the scaling properties of the model using finite-size scaling analysis. A robust power-law behavior is observed for the probability density of the size of avalanches in a certain range of λ values. The two exponents which determine the dependence of the probability density on time and system size both depend continuously on λ, i.e., the model exhibits nonuniversal behavior. We also measured the roughness of the surface of the sandpile and here we obtained a universal behavior, i.e., a roughness exponent of about 1.75 for all values of λ. For the temporal behavior of the mass, a f^−Φ spectrum is obtained with an exponent Φ close to 2, again for all λ-values.