On the Power of Symmetrized Pearson's Type Test under Local Alternatives in Autoregression with Outliers

Abstract

We consider a stationary linear AR(p) model with observations subject to gross errors (outliers). The autoregression parameters are unknown as well as the distribution function G of innovations. The distribution of outliers is unknown and arbitrary, their intensity is γ n-1/2 with an unknown γ, n is the sample size. We test the hypothesis H0 G=G0 with simmetric G0. We find the power of the test under local alternatives H1n() G=(1- n-1/2)G0+ n-1/2H. Our test is the special symmetrized Pearson's type test. Namely, first of all we estimate the autoregression parameters and then using the residuals from the estimated autoregression we construct a kind of empirical distribution function (e.d.f.), which is a counterpart of the (inaccessible) e.d.f. of the autoregression innovations. We obtain a stochastic expansion of this e.d.f. and its symmetrized variant under H1n() , which enables us to construct and investigate our symmetrized test of Pearson's type for H0. We establish qualitative robustness of this test in terms of uniform equicontinuity of the limiting power (as functions of γ, and ) with respect to γ in a neighborhood of γ=0.