Age-Related Reference Regions for Longitudinal Measurements of Growth Characteristics

 

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Abstract

Most studies on age-related reference centiles published up to now have adopted a strictly cross-sectional perspective. Clearly, the results of studies of that type do not provide a tool for the diagnostic assessment of whole series of measurements taken sequentially over time in the same individual. In this paper, the approach of Wellek & Merz (1995) to the construction of age-dependent reference ranges for cross-sectional measurements is generalized in such a way that data sets containing time series of arbitrary length varying between subjects can be accommodated. Since repeated measurements on the same subject are typically correlated, the regression function to be used as the central line for the reference band eventually obtained is determined by fitting a nonlinear mixed model describing the dependence of conditional means on age by growth functions of the same class we proposed in the case of cross-sectional data. Estimation of the parameters of this mixed model is done in a way closely related to the population-averaged GEE approach by Zeger et al. (1988). Given the regression line, the reference band is constructed by means of an iterative procedure guaranteeing that the proportion of observed profiles which nowhere leave the band, has some prespecified value (frequently set equal to 90% in practice). The approach is illustrated with two examples taken from child psychiatry and prenatal sonography.

• References

• 1 Cole TJ. Fitting smoothed centile curves to reference data. J Roy Statist Soc A 1988; 151: 385-418.
  PubMedGoogle Scholar
• 2 Royston P. Constructing time-specific reference ranges. Statist Med 1991; 10: 675-90.
  CrossrefPubMedGoogle Scholar
• 3 Altman DG. Construction of age-related reference centiles using absolute residuals. Statist Med 1993; 12: 917-24.
  CrossrefPubMedGoogle Scholar
• 4 Royston P, Wright EM. How to construct “normal ranges” for fetal variables. Ultra-sound Obstet Gynaecol 1998; 11: 30-8.
  CrossrefPubMedGoogle Scholar
• 5 Royston P. Calculation of unconditional and conditional reference intervals for foetal size and growth from longitudinal measurements. Statist Med 1995; 14: 1417-36.
  CrossrefPubMedGoogle Scholar
• 6 Wellek S, Merz E. Age-related reference ranges for growth parameters. Methods of Information in Medicine 1995; 34: 523-8.
  Article in Thieme ConnectPubMedGoogle Scholar
• 7 Zeger SL, Liang KY, Albert PS. Models for longitudinal data: A generalized estimation equation approach. Biometrics 1988; 44: 1049-60.
  CrossrefPubMedGoogle Scholar
• 8 Gennings C, Chinchilli VM, Carter WH. Response surface analysis with correlated data: a nonlinear model approach. JASA 1989; 84: 805-9.
  CrossrefPubMedGoogle Scholar
• 9 Prentice RL, Zhao LP. Estimating equations for parameters in means and covariances of multivariate discrete and continuous responses. Biometrics 1991; 47: 825-39.
  CrossrefPubMedGoogle Scholar
• 10 Littel RC, Milliken GA, Stroup WW, Wol-finger RD. SAS System for Mixed Models. Cary, NC: SAS Institute Inc.; 1996
  Google Scholar
• 11 Rothenberger A, Schmidt MH. Die Funktionen des Frontalhirns und der Verlauf psychischer Störungen. Frankfurt: Peter Lang; (in press).
  Google Scholar
• 12 Merz E, Wellek S, Bahlmann F, Weber G. Sonographische Normkurven des fetalen knöchernen Thorax und der fetalen Lunge. Geburtshilfe Frauenheilkunde 1995; 55: 77-82.
  PubMedGoogle Scholar