Abstract
In this paper a new test for the parametric form of the variance function in the common nonparametric regression model is proposed which is applicable under very weak smoothness assumptions. The new test is based on an empirical process formed from pseudo residuals, for which weak convergence to a Gaussian process can be established. In the special case of testing for homoscedasticity the limiting process is essentially a Brownian bridge, such that critical values are easily available. The new procedure has three main advantages. First, in contrast to many other methods proposed in the literature, it does not depend directly on a smoothing parameter. Secondly, it can detect local alternatives converging to the null hypothesis at a rate n −1/2. Thirdly, in contrast to most of the currently available tests, it does not require strong smoothness assumptions regarding the regression and variance function. We also present a simulation study and compare the tests with the procedures that are currently available for this problem and require the same minimal assumptions.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Achieser, N.J.: Theory of approximation. Dover, NY (1956)
Bickel, P.: Using residuals robustly I: tests for heteroscedasticity. Annals of Statistics 6, 266–291 (1978)
Billingsley, P. (1999). Convergence of probability measures, (2nd ed.). Chichester: Wiley Series in Probability and Statistics.
Carroll, R.J., Ruppert, D.: On robust tests for heteroscedasticity. Annals of Statistics 9, 205–209 (1981)
Carroll, R.J., Ruppert, D.: Transformation and weighting in regression. Monographs on statistics and applied probability. Chapman and Hall, New York (1988)
Cook, R.D., Weisberg, S.: Diagnostics for heteroscedasticity in regression. Biometrika 70, 1–10 (1983)
Davidan, M., Caroll, R.: Variance function estimation. Journal of the American Statistical Association 82, 1079–1091 (1987)
Dette, H.: A consistent test for heteroscedasticity in nonparametric regression based on the kernel method. Journal of Statistical Planning and Inference 103, 311–329 (2002)
Dette, H., Munk, A.: Testing heteroscedasticity in nonparametric regression. Journal of the Royal Statistical Society B 60, 693–708 (1998)
Dette, H., Munk, A., Wagner, T.: Estimating the variance in nonparametric regression—what is a reasonable choice?. Journal of the Royal Statistical Society B 60, 751–764 (1998)
Diblasi, A., Bowman, A.: Testing for constant variance in a linear model. Statistics & Probability Letters 33, 95–103 (1997)
Fan, J., Gijbels, I.: Local polynomial modelling and its applications. Chapman & Hall, London (1996)
Gallant, A.R.: Nonlinear statistical models. Wiley, NY (1987)
Gasser, T., Sroka, L., Jennen-Steinmetz, G.: Residual variance and residual pattern in nonlinear regression. Biometrika 73, 625–633 (1986)
Griffiths, W.E., Hill, R.C., Judge, G.G.: Learning and practicing econometrics. Wiley, NY (1993)
Hall, P., Kay, J.W., Titterington, D.M.: Asymptotically optimal difference-based estimation of variance in nonparametric regression. Biometrika 77, 521–528 (1990)
Leedan, Y., Meer, P.: Heteroscedastic regression in computer vision: problems with bilinear constraint. International Journal of Computer Vision 37, 127–150 (2000)
Liebscher, E.: Central limit theorems for sums of α-mixing random variables. Stochastics and Stochastics Reports 59, 241–258 (1996)
Liero, H.: Testing homoscedasticity in nonparametric regression. Journal of Nonparametric Statistics 15, 31–51 (2003)
Munk, A.: Testing the goodness of fit of parametric regression models with random Toeplitz forms. Scandinavian Journal of Statistics 29, 501–533 (2002)
Sacks, J., Ylvisaker, D.: Designs for regression problems with correlated errors III. Annals of Mathematical Statistics 41, 2057–2074 (1970)
Sadray, S., Rezaee, S., Rezakhah, S.: Non-linear heteroscedastic regression model for determination of methrotrexate in human plasma by high-performance liquid chromatography. Journal of Chromatography B 787, 293–302 (2003)
Seber, G.A.F., Wild, G.J.: Nonlinear regression. Wiley, NY (1989)
Zhu, L.: Nonparametric Monte Carlo tests and their applications. In Lecture notes in statistics (Vol. 182). Springer, NY (2005)
Zhu, L., Fujikoshi, Y., Naito, K.: Heteroscedasticity checks for regression models. Science in China (Series A) 44, 1236–1252 (2001)
Author information
Authors and Affiliations
Corresponding author
About this article
Cite this article
Dette, H., Hetzler, B. A simple test for the parametric form of the variance function in nonparametric regression. Ann Inst Stat Math 61, 861–886 (2009). https://doi.org/10.1007/s10463-008-0169-1
Received:
Revised:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s10463-008-0169-1