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On Testing for the Constancy of Regression Coefficients under Random Walk and Change-Point Alternatives

Published online by Cambridge University Press:  18 October 2010

V.K. Jandhyala  and
I.B. MacNeill
V.K. Jandhyala
Affiliation:
Washington State University
I.B. MacNeill
Affiliation:
The University of Western Ontario
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Abstract

The locally best invariant statistic to test for the constancy of regression coefficients under a random walk alternative is shown to be the same as a Bayesian-type statistic derived under a change-point alternative. Asymptotic theory for this and more general statistics is discussed.

Type
Articles
Information
Econometric Theory , Volume 8 , Issue 4 , December 1992 , pp. 501 - 517
Copyright
Copyright © Cambridge University Press 1992

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References

REFERENCES

1.Anderson, T.W. & Darling, D.A., Asymptotic theory of certain “goodness of fit” criteria based on stochastic processes. Annals of Mathematical Statistics 23 (1952): 193212.CrossRefGoogle Scholar
2.Anderson, T.W. & Darling, D.A.. A test of goodness of fit. Journal of the American Statistical Association 49 (1954): 765769.CrossRefGoogle Scholar
3.Brown, R.L., Durbin, J. & Evans, J.M.. Techniques for testing the constancy of regression relationships over time. Journal of the Royal Statistical Society B37 (1975): 149192.Google Scholar
4.Chernoff, H. & Zacks, S.. Estimating the current mean of a normal distribution which is subjected to changes in time. Annals of Mathematical Statistics 35 (1964): 9991018.Google Scholar
5.Cooley, T.F. & Prescott, E.G.. Systematic (non-random) variation models, varying parameter regression: A theory and some applications. Annals of Economic and Social Measurement 2 (1973): 463473.Google Scholar
6.Cooley, T.F. & Prescott, B.C.. Estimation in the presence of stochastic parameter variation. Econometrica 44 (1976): 167183.CrossRefGoogle Scholar
7.Farley, J.V. & Hinich, M.J.. A test for a shifting slope coefficient in a linear model. Journal of the American Statistical Association 65 (1970): 13201329.CrossRefGoogle Scholar
8.Feder, P.I.The log likelihood ratio in segmented regression. Annals of Statistics 3 (1975): 8497.CrossRefGoogle Scholar
9.Gardner, L.A.On detecting changes in the mean of normal variates. Annals of Mathematical Statistics 40 (1969): 116126.CrossRefGoogle Scholar
10.Hsu, D.A.Tests for variance shift at an unknown time point. Applied Statistics 26 (1977): 279284.CrossRefGoogle Scholar
11.Jandhyala, V.K. & MacNeill, I.B.. Residual partial sum limit process for regression models with applications to detecting parameter changes at unknown times. Stochastic Processes and Their Applications 33 (1989): 309323.CrossRefGoogle Scholar
12.Jandhyala, V.K. & MacNeill, I.B.. Tests for parameter changes at unknown times in linear regression models. Journal of Statistical Planning and Inference 27 (1991): 291316.CrossRefGoogle Scholar
13.Liu, L.M. & Hanssens, D.M.. A Bayesian approach to time varying cross sectional regression models. Journal of Econometrics 15 (1981): 341356.CrossRefGoogle Scholar
14.MacNeill, I.B.Tests for change of parameter at unknown time and distributions of some related functionals on Brownian motion. Annals of Statistics 2 (1974): 950962.CrossRefGoogle Scholar
15.MacNeill, I.B.Properties of sequences of partial sums of polynomial regression residuals with applications to tests for change of regression at unknown times. Annals of Statistics 6 (1978): 422433.CrossRefGoogle Scholar
16.MacNeill, I.B.Limit processes for sequences of partial sums of regression residuals. Annals of Probability 6 (1978): 695698.CrossRefGoogle Scholar
17.MacNeill, I.B. & Jandhyala, V.K.. The residual process for non-linear regression. Journal of Applied Probability 22 (1985): 957963.CrossRefGoogle Scholar
18.Nabeya, S. & Tanaka, K.. Asymptotic theory of a test for the constancy of regression coefficients against the random walk alternative. Annals of Statistics 16 (1988): 218235.CrossRefGoogle Scholar
19.Pagan, A.Some identification and estimation results for regression models with stochastically varying coefficients. Journal of Econometrics 13 (1980): 341363.Google Scholar
20.Sarris, A.H.A Bayesian approach to estimation of time varying regression coefficients. Annals of Economic and Social Measurement 2 (1973): 501523.Google Scholar
21.Sen, A.K. & Srivastava, M.S.. On multivariate tests for detecting change in mean. Sankhya A35 (1973): 173185.Google Scholar
22.Sen, A.K. & Srivastava, M.S.. On tests for detecting change in mean. Annals of Statistics 3 (1975): 98108.CrossRefGoogle Scholar
23.Smith, A.F.M.A Bayesian approach to inference about a change point in a sequence of random variables. Biometrika 52 (1975): 407416.CrossRefGoogle Scholar
24.Swamy, P.A.V.B. & Tinsley, P.A.. Linear prediction and estimation methods for regression models with stationary stochastic coefficients. Journal of Econometrics 12 (1980): 103142.CrossRefGoogle Scholar
25.Tang, S.M. & MacNeill, I.B.. Monitoring statistics which have increased power over a reduced time range. Environmental Monitoring and Assessment (1992): to appear.CrossRefGoogle Scholar
26.Worsley, K.J.Testing for a two phase multiple regression. Technometrics 25 (1983): 3542.Google Scholar