Parameter estimation in a spatial unit root autoregressive model

Abstract

Spatial unilateral autoregressive model Xk,=α Xk-1,+β Xk,-1+γ Xk-1,-1+εk, is investigated in the unit root case, that is when the parameters are on the boundary of the domain of stability that forms a tetrahedron with vertices (1,1,-1), \ (1,-1,1),\ (-1,1,1) and (-1,-1,-1). It is shown that the limiting distribution of the least squares estimator of the parameters is normal and the rate of convergence is n when the parameters are in the faces or on the edges of the tetrahedron, while on the vertices the rate is n3/2.