A note on self-normalization for a simple spatial autoregressive model

We examine the Markov chain Xt = q~(Xt-i )+etb, where Xt = (x,, ..., x,\_p+~ )~, b = ( 1,0 ..... 0)L Under some appropriate conditions on q~, we show the ergodicity for {X,} when Eet 2 is suitable small, and the geometric ergodicity when Ee I~' 1 is suitably small.

Suppose that {X,} is the stationary AR(p) process of the form: X, -/,t = fll(Xt.-i -la) + ... + [~t,(X,\_p -I~) + ~:,, where {~:,} is a sequence of i.i.d, random variables with mean zero and finite variance a 2. In this paper, we study the asymptotic behavior of the empirical process computed from t

For the pth-order linear ARCH model, St = gt~/O{O q-~lXt2\_l q-0~2 X.2\_2 +-.-q-o~pXtLp, where c~0 > 0, c~i~>0, i = 1, 2, ..., p, {et} is an i.i.d, normal white noise with E~, = 0, Ee~ = 1, and et is independent of {X~, s < t}, Engle (1982) obtained the necessary and sufficient condition for the sec