2001, Volume 4, Number 1, pp.85-89
For the Bak-Sneppen evolution model we present two master equations
prescribing hierarchical structures of undercritical f0 avalanches and
overcritical ones respectively. Taylor expansions of the master equations
generate two infinite series of exact equations.
Solutions of the two first-leading-order equations yield two universal
exponents: gamma, for "gamma" equation, and beta, for "beta" equation.
It is found that gamma and beta are each determined by a scaling function,
related to the configurations of the system.
It is also shown that both gamma and beta equal 1 as the critical state is reached.
Key words: self-organized criticality, evolution model, master
equation, undercritical avalanches, over-critical avalanches, scaling function
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