The Combinatorics of Avalanche Dynamics

Abstract

We give a simple and elementary proof of the identity Σr=1nΣk1,...,kr 1: Σi=1r ki= n n! k1!k2!...kr!k1k2...kr-1kr=(n+1)n-1 where n∈ N. A first application of this formula shows Cayley's theorem Caley on the number of trees with n+1 vertices (in fact the formula is equivalent to Cayley's result). A second application gives the distribution of avalanche sizes, which can be deduced for general dynamical systems and also as a bilogically motivated urn model in probability. In particular, the law of avalanche sizes in Eurich et al. EHE and Levina Levina is closely related to this dynamical representation.