A Class of Long Range Circulant Random Walks on Zqd

Abstract

This paper studies a class of long range random walks (Xt)t=0∞ on the direct product of cyclic groups Zqd for d 1 and q 2. Xt+1 = Xt + Zt q, with (Zt)t=1∞ on \0,1,…, q-1\d. Entries of Zt are updated by circulant matrices, possibly with dependence. Multiple entries of Zt can be non-zero in a transition. An emphasis is on finding the structure of such random walks and spectral expansions for the transition functions. An extension is made to processes on a d-dimensional torus, scaling entries in \0,1,…, q-1\ by dividing by q and letting q ∞. The state space is then d circles of unit perimeter, where 0 and 1 are identified as the same point in each circle. If the entries of Xt are exchangeable then a grouping of Xt is made by taking counts of the types 0,…, q-1 in Xt. In this grouping the multivariate Krawtchouk polynomials become the eigenvectors. Examples consider cutoff times and mixing times in these processes. A limit form for the multivariate Krawtchouk polynomials is used to find a central limit theorem for the transition distributions in the grouped model as d ∞.