Polynuclear growth and the Toda lattice
Abstract
It is shown that the polynuclear growth model is a completely integrable Markov process in the sense that its transition probabilities are given by Fredholm determinants of kernels produced by a scattering transform based on the invariant measures modulo the absolute height, continuous time simple random walks. From the linear evolution of the kernels, it is shown that the n-point distributions are determinants of n× n matrices evolving according to the two dimensional non-Abelian Toda lattice.
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