Abstract and Keywords
This chapter overviews recent developments in series estimation of stochastic processes and some of their applications in econometrics. Underlying this approach is the idea that a stochastic process may under certain conditions be represented in terms of a set of orthonormal basis functions, giving a series representation that involves deterministic functions. Several applications of this series approximation method are discussed. The first application shows how a continuous function can be approximated by a linear combination of Brownian motions (BMs), which is useful in the study of the spurious regressions. The second application utilizes the series representation of BM to investigate the effect of the presence of deterministic trends in a regression on traditional unit-root tests. The third application uses basis functions in the series approximation as instrumental variables (IVs) to perform efficient estimation of the parameters in cointegrated systems. The fourth application proposes alternative estimators of long-run variances in some econometric models with dependent data, thereby providing autocorrelation robust inference methods in these models. This chapter reviews some work related to these applications and some ongoing research involving series approximation methods.
Keywords: cointegrated system, HAC estimation, instrumental variables, Lasso regression, Karhunen–Loève representation, long-run variance, reproducing kernel Hilbert space, oracle efficiency, orthonormal system, trend basis