Nonparametric estimation in a nonlinear cointegration type model

Abstract

We derive an asymptotic theory of nonparametric estimation for a time series regression model Zt=f(Xt)+Wt, where \Xt\ and \Zt\ are observed nonstationary processes and \Wt\ is an unobserved stationary process. In econometrics, this can be interpreted as a nonlinear cointegration type relationship, but we believe that our results are of wider interest. The class of nonstationary processes allowed for \Xt\ is a subclass of the class of null recurrent Markov chains. This subclass contains random walk, unit root processes and nonlinear processes. We derive the asymptotics of a nonparametric estimate of f(x) under the assumption that \Wt\ is a Markov chain satisfying some mixing conditions. The finite-sample properties of f(x) are studied by means of simulation experiments.