On the p,q-binomial distribution and the Ising model

Abstract

A completely new approach to the Ising model in 1 to 5 dimensions is developed. We employ p,q-binomial coefficients, a generalisation of the binomial coefficients, to describe the magnetisation distributions of the Ising model. For the complete graph this distribution corresponds exactly to the limit case p=q. We take our investigation to the simple d-dimensional lattices for d=1,2,3,4,5 and fit p,q-binomial distributions to our data, some of which are exact but most are sampled. For d=1 and d=5 the magnetisation distributions are remarkably well-fitted by p,q-binomial distributions. For d=4 we are only slightly less successful, while for d=2,3 we see some deviations (with exceptions!) between the p,q-binomial and the Ising distribution. We begin the paper by giving results on the behaviour of the p,q-distribution and its moment growth exponents given a certain parameterization of p,q. Since the moment exponents are known for the Ising model (or at least approximately for d=3) we can predict how p,q should behave and compare this to our measured p,q. The results speak in favour of the p,q-binomial distribution's correctness regarding their general behaviour in comparison to the Ising model. The full extent to which they correctly model the Ising distribution is not settled though.