The linear Ising model and its analytic continuation, random walk
Abstract
A generalization of Gauss's principle is used to derive the error laws corresponding to Types II and VII distributions in Pearson's classification scheme. Student's -pdf (Type II) governs the distribution of the internal energy of a uniform, linear chain, Ising model, while analytic continuation of the uniform exchange energy converts it into a Student -density (Type VII) for the position of a random walk in a single spatial dimension. Higher dimensional spaces, corresponding to larger degrees of freedom and generalizations to multidimensional Student - and -densities, are obtained by considering independent and identically distributed random variables, having rotationally invariant densities, whose entropies are additive and generating functions are multiplicative.
Cite
@article{arxiv.cond-mat/0402600,
title = {The linear Ising model and its analytic continuation, random walk},
author = {B. H. Lavenda},
journal= {arXiv preprint arXiv:cond-mat/0402600},
year = {2011}
}
Comments
5 pages