Locally Optimal Properties of the Durbin-Watson Test
- 1 December 1988
- journal article
- Published by Cambridge University Press (CUP) in Econometric Theory
- Vol. 4 (3), 509-516
- https://doi.org/10.1017/s0266466600013426
Abstract
Although originally designed to detect AR(1) disturbances in the linear-regression model, the Durbin-Watson test is known to have good power against other forms of disturbance behavior. In this paper, we identify disturbance processes involving any number of parameters against which the Durbin–Watson test is approximately locally best invariant uniformly in a range of directions from the null hypothesis. Examples include the sum of q independent ARMA(1,1) processes, certain spatial autocorrelation processes involving up to four parameters, and a stochastic cycle model.Keywords
This publication has 13 references indexed in Scilit:
- Locally Optimal Tests for Multiparameter HypothesesJournal of the American Statistical Association, 1986
- Testing for Block Effects in Regression Models Based on Survey DataJournal of the American Statistical Association, 1986
- Locally Optimal Tests for Multiparameter HypothesesJournal of the American Statistical Association, 1986
- Testing for Block Effects in Regression Models Based on Survey DataJournal of the American Statistical Association, 1986
- Trends and Cycles in Macroeconomic Time SeriesJournal of Business & Economic Statistics, 1985
- An Engel Curve Analysis of Household Expenditure in New ZealandEconomic Record, 1985
- TESTING FOR MOVING AVERAGE REGRESSION DISTURBANCESAustralian Journal of Statistics, 1983
- Testing for a Serially Correlated Component in Regression DisturbancesInternational Economic Review, 1982
- Evaluation of the Power of the Durbin-Watson Statistic for Non-First Order Serial Correlation AlternativesThe Review of Economics and Statistics, 1973
- On the Theory of Unbiased Tests of Simple Statistical Hypotheses Specifying the Values of Two or More ParametersThe Annals of Mathematical Statistics, 1951