Levy-Nearest-Neighbors Bak-Sneppen Model
Abstract
We study a random neighbor version of the Bak-Sneppen model, where "nearest neighbors" are chosen according to a probability distribution decaying as a power-law of the distance from the active site, P(x) |x-xac |-ω. All the exponents characterizing the self-organized critical state of this model depend on the exponent ω. As ω tends to 1 we recover the usual random nearest neighbor version of the model. The pattern of results obtained for a range of values of ω is also compatible with the results of simulations of the original BS model in high dimensions. Moreover, our results suggest a critical dimension dc=6 for the Bak-Sneppen model, in contrast with previous claims.
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