BBS invariant measures with independent soliton components

Abstract

The Box-Ball System (BBS) is a one-dimensional cellular automaton in \0,1\ introduced by Takahashi and Satsuma TS, who also identified conserved sequences called solitons. Integers are called boxes and a ball configuration indicates the boxes occupied by balls. For each integer k1, a k-soliton consists of k boxes occupied by balls and k empty boxes (not necessarily consecutive). Ferrari, Nguyen, Rolla and Wang FNRW define the k-slots of a configuration as the places where k-solitons can be inserted. Labeling the k-slots with integer numbers, they define the k-component of a configuration as the array \ζk(j)\j∈ Z of elements of 0 giving the number ζk(j) of k-solitons appended to k-slot j∈ Z. They also show that if the Palm transform of a translation invariant distribution μ has independent soliton components, then μ is invariant for the automaton. We show that for each λ∈[0,1/2) the Palm transform of a product Bernoulli measure with parameter λ has independent soliton components and that its k-component is a product measure of geometric random variables with parameter 1-qk(λ), an explicit function of λ. The construction is used to describe a large family of invariant measures with independent components under the Palm transformation, including Markov measures.