Advanced search
Publication Cover
Communications in Statistics - Theory and Methods Volume 46, 2017 - Issue 24
Submit an article Journal homepage
88
Views
0
CrossRef citations to date
0
Altmetric
Original Articles

Multiple-response repeated measurement or multivariate growth curve model with distribution-free errors

Xin XinSchool of Mathematics and Statistics, Henan University, Kaifeng, Henan, P.R. ChinaCorrespondence[email protected]
&
Feng QiuScience College, Zhejiang Agriculture and Forestry University, Linan, Zhejiang, P.R. China
Pages 12370-12386 | Received 20 May 2016, Accepted 18 Feb 2017, Published online: 06 Sep 2017

References

  • Carter, E. M., and J. J. Hubert. 1984. A growth-curve model approach to multivariate quantal bioassay. Biometrics 40:699–706.
  • Curran, P. J. 1998. Introduction to hierarchical linear models of individual growth: An applied example using the SAS data system. Paper presented at the First International Institute on Developmental Science, University of North Carolina, Chapel Hill .
  • Demidenko, E. 2004. Mixed models theory and applications. Hobken, New Jerscy: John Wiley & Sons, Inc.
  • Fujikoshi, Y., and C. R. Rao. 1991. Selecting of covariables in the growth curve model. Biometrika 78:779–85.
  • Grizzle, J. E., and D. M. Allen. 1969. Analysis of growth and dose response curves. Biometrics 25:357–81.
  • Hu, J., F. Liu, and S. E. Ahmed. 2012. Estimation of parameters in the growth curve model via an outer product least squares approach for covariance. The Journal of Multivariate Analysis 108:53–66.
  • Hu, J., X. Xin, and J. You. 2014. Model determination and estimation for the growth curve model via group SCAD penalty. The Journal of Multivariate Analysis 124:199–213.
  • Hu, J., and G. Yan. 2008. Asymptotic normality and consistency of a two-stage generalized least squares estimator in the growth curve model. Bernoulli 14:623–36.
  • Hu, J., G. Yan, and J. You. 2011. Estimation for an additive growth curve model with orthogonal design matrices. Bernoulli 17:1400–19.
  • Hwang, H., and Y. Takane. 2004. A multivariate reduced-rank growth curve model with unbalanced data. Psychometrika 69:65–79.
  • Hwang, H., and Y. Takane. 2005. An extended multivariate reduced-rank growth curve model. Behaviormetrika 32:141–53.
  • Khatri, C. G. 1966. A note on a MANOV model applied to problems in growth curves. Annals of the Institute of Statistical Mathematics 18:75–86.
  • Kollo, T., A. Roos, and D. von Rosen. 2007. Approximation of the distribution of the location parameter in the growth curve model. Scandinavian Journal of Statistics 34:499–510.
  • Lee, J. C. 1988. Prediction and estimation of growth curves with special covariance structures. Journal of the American Statistical Association 83:432–40.
  • Liu, A. 1993. An efficient estimation of seemingly unrelated multivariate regression models with application to growth curve analysis. Statistica Sinica 3:421–34.
  • Liu, F., J. Hu, and G. Chu. 2015. Estimation of parameters in the extended growth curve model via outer product least squares for covariance. Linear Algebra and its Applications 473:236–60.
  • Liu, X., and J. Hu. 2015. Estimation of patterned covariance in multivariate linear models: An outer product least squares approach. Statistics 49:408–26.
  • Lundbye-Christensen, S. 1991. A multivariate growth curve model for pregnancy. Biometrics 31:432–40.
  • Ohlson, M., and D. von Rosen. 2010. Explicit estimator of parameters in the growth curve model with linearly structured covariance matrices. Journal of Multivariate Analysis 31:187–200.
  • Pan, J. X., and K. T. Fang. 2002. Growth curve models and statistical diagnostics . Springer Series in Statistics. New York: Springer-Verlag 2002.
  • Potthoff, R. F., and S. N. Roy. 1964. A generalized multivariate analysis of variance model useful especially for growth curve problems. Biometrika 51:313–26.
  • Rao, C. R. 1965. The theory of last squares when the parameters are stochastic and its application to the analysis of growth curves, Biometrika 52:447–58.
  • Reinsel, G. C. 1982. Multivariate repeated-measurement or growth curve models with multivariate random-effects covariance structure. Journal of the American Statistical Association 77:190–5.
  • Satoh, K., M. Kobayashi, and Y. Fujikoshi. 1997. Variable selection for the growth curve model. Journal of Multivariate Analysis 60:277–92.
  • von Rosen, D. 1989. Maximum likelihood estimators in multivariate linear normal models. Journal of Multivariate Analysis 31:187–200.
  • Wang, S. G., E. P. Liski, and T. Nummi. 1999. Two way selection of covariates in multivariate growth curve model. Linear Algebra and its Applications 289:333–42.
  • Xu, L. W., and S. G. Wang. 2011. Linear sufficiency in a general growth curve model. Linear Algebra and its Applications 434:593–604.
  • Zellner, A. 1962. An efficient method of estimating seemingly unrelated regressions and test for aggregation bias. Journal of the American Statistical Association 57:348–68.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.