English

First-order planar autoregressive model

Probability 2025-01-30 v1

Abstract

This paper establishes the conditions of existence of a stationary solution to the first order autoregressive equation on a plane as well as properties of the stationarity solution. The first-order autoregressive model on a plane is defined by the equation Xi,j=aXi1,j+bXi,j1+cXi1,j1+ϵi,j.X_{i,j} = a X_{i-1,j} + b X_{i,j-1} + c X_{i-1,j-1} + \epsilon_{i,j}. A stationary solution XX to the equation exists if and only if (1abc)(1a+b+c)(1+ab+c)(1+a+bc)>0(1-a-b-c) (1-a+b+c) (1+a-b+c) (1+a+b-c) > 0. The stationary solution XX satisfies the causality condition with respect to the white noise ϵ\epsilon if and only if 1abc>01-a-b-c>0, 1a+b+c>01-a+b+c>0, 1+ab+c>01+a-b+c>0 and 1+a+bc>01+a+b-c>0. A sufficient condition for X to be purely nondeterministic is provided. An explicit expression for the autocovariance function of XX at some points is provided. With Yule-Walker equations, this allows to compute the autocovariance function everywhere. In addition, all situations are described where different parameters determine the same autocovariance function of XX.

Cite

@article{arxiv.2402.01563,
  title  = {First-order planar autoregressive model},
  author = {Sergiy Shklyar},
  journal= {arXiv preprint arXiv:2402.01563},
  year   = {2025}
}

Comments

40 pages, 4 tables

R2 v1 2026-06-28T14:36:05.801Z