A Class of Gaussian Fields on Zqd

Abstract

Gaussian fields (gx) on Zqd are constructed from a class of reversible long range random walks (Xt)t∈ N on Zqd in arXiv:2510.22554. The construction is from taking the covariance function of (gx) as (1-α)G(x,y;α), where G(x,y;α) is the Green function of a random walk with killing in each transition at rate 1-α. A decomposition of the Gaussian field into a sum of independent Gaussian random variables is made. By letting q ∞ the Gaussian field becomes defined from an infinite-dimensional random walk on a torus. The random walk model is also extended to d=∞ by considering a de Finetti random walk where entries in the increments of the random walk are exchangeable. A limit Gaussian field on Rd arises from a central limit theorem approach. The transform of this Gaussian field, which is again a Gaussian field, is calculated. It has a simpler covariance matrix than the original field. The Hamiltonian connected to the Gaussian field is calculated. A limit theorem for the partition function arising from the Hamiltonian is found.