Asymptotic Expansions in Nonstationary Vector Autoregressions
- 11 February 1987
- journal article
- research article
- Published by Cambridge University Press (CUP) in Econometric Theory
- Vol. 3 (1) , 45-68
- https://doi.org/10.1017/s0266466600004126
Abstract
This paper studies the statistical properties of vector autoregressions (VAR's) for quite general multiple time series which are integrated processes of order one. Functional central limit theorems are given for multivariate partial sums of weakly dependent innovations and these are applied to yield first-order asymptotics in nonstationary VAR's. Characteristic and cumulant functionals for generalized random processes are introduced as a means of developing a refinement of central limit theory on function spaces. The theory is used to find asymptotic expansions of the regression coefficients in nonstationary VAR's under very general conditions. The results are specialized to the scalar case and are related to other recent work by the author [21].Keywords
This publication has 15 references indexed in Scilit:
- Atheoretical macroeconometrics: A critiqueJournal of Monetary Economics, 1985
- A functional central limit theorem for ϱ-mixing sequencesJournal of Multivariate Analysis, 1984
- A Functional Central Limit Theorem for Weakly Dependent Sequences of Random VariablesThe Annals of Probability, 1984
- Forecasting and conditional projection using realistic prior distributionsEconometric Reviews, 1984
- Nonlinear Regression with Dependent ObservationsEconometrica, 1984
- Testing For Unit Roots: 1Econometrica, 1981
- Macroeconomics and RealityEconometrica, 1980
- Edgeworth and saddlepoint approximations in the first-order noncircular autoregressionBiometrika, 1978
- Approximations to Some Finite Sample Distributions Associated with a First-Order Stochastic Difference EquationEconometrica, 1977
- On the Statistical Treatment of Linear Stochastic Difference EquationsEconometrica, 1943