Polynomial Spline Estimation and Inference for Varying Coefficient Models with Longitudinal Data

We consider nonparametric estimation of coefficient functions in a varying coefficient model of the form Yij = X T i (tij)β(tij)+ i(tij) based on longitudinal observations {(Yij , Xi(tij), tij), i = 1, . . . , n, j = 1, . . . , ni}, where tij and ni are the time of the jth measurement and the number of repeated measurements for the ith subject, and Yij and Xi(tij) = (Xi0(tij), . . . , XiL(tij)) T for L ≥ 0 are the ith subject’s observed outcome and covariates at tij . We approximate each coefficient function by a polynomial spline and employ the least squares method to do the estimation. An asymptotic theory for the resulting estimates is established, including consistency, rate of convergence and asymptotic distribution. The asymptotic distribution results are used as a guideline to construct approximate confidence intervals and confidence bands for components of β(t). We also propose a polynomial spline estimate of the covariance structure of (t), which is used to estimate the variance of the spline estimate β̂(t). A data example in epidemiology and a simulation study are used to demonstrate our methods.

[1]  Chin-Tsang Chiang,et al.  KERNEL SMOOTHING ON VARYING COEFFICIENT MODELS WITH LONGITUDINAL DEPENDENT VARIABLE , 2000 .

[2]  B. Silverman,et al.  Estimating the mean and covariance structure nonparametrically when the data are curves , 1991 .

[3]  E. Vonesh,et al.  Linear and Nonlinear Models for the Analysis of Repeated Measurements , 1996 .

[4]  C. J. Stone,et al.  Optimal Global Rates of Convergence for Nonparametric Regression , 1982 .

[5]  R. Carroll,et al.  Nonparametric Function Estimation for Clustered Data When the Predictor is Measured without/with Error , 2000 .

[6]  P J Diggle,et al.  Nonparametric estimation of covariance structure in longitudinal data. , 1998, Biometrics.

[7]  Peter J. Diggle,et al.  RATES OF CONVERGENCE IN SEMI‐PARAMETRIC MODELLING OF LONGITUDINAL DATA , 1994 .

[8]  Marie Davidian,et al.  Nonlinear Models for Repeated Measurement Data , 1995 .

[9]  Chin-Tsang Chiang,et al.  Smoothing Spline Estimation for Varying Coefficient Models With Repeatedly Measured Dependent Variables , 2001 .

[10]  Jeffrey D. Hart,et al.  Nonparametric Smoothing and Lack-Of-Fit Tests , 1997 .

[11]  J. Rice,et al.  Smoothing spline models for the analysis of nested and crossed samples of curves , 1998 .

[12]  P. Diggle An approach to the analysis of repeated measurements. , 1988, Biometrics.

[13]  Li Ping Yang,et al.  Nonparametric smoothing estimates of time-varying coefficient models with longitudinal data , 1998 .

[14]  R. Eubank Nonparametric Regression and Spline Smoothing , 1999 .

[15]  D. M. Titterington,et al.  On confidence bands in nonparametric density estimation and regression , 1988 .

[16]  G. Molenberghs,et al.  Linear Mixed Models for Longitudinal Data , 2001 .

[17]  Jianhua Z. Huang,et al.  Varying‐coefficient models and basis function approximations for the analysis of repeated measurements , 2002 .

[18]  C. R. Deboor,et al.  A practical guide to splines , 1978 .

[19]  J. Phair,et al.  The Multicenter AIDS Cohort Study: rationale, organization, and selected characteristics of the participants. , 1987, American journal of epidemiology.

[20]  S. Demko Inverses of Band Matrices and Local Convergence of Spline Projections , 1977 .

[21]  Jerome Sacks,et al.  Confidence Bands for Regression Functions , 1985 .

[22]  Philippe Besse,et al.  Simultaneous non-parametric regressions of unbalanced longitudinal data , 1997 .

[23]  P. Diggle,et al.  Semiparametric models for longitudinal data with application to CD4 cell numbers in HIV seroconverters. , 1994, Biometrics.

[24]  Daniel Q. Naiman,et al.  Abstract tubes, improved inclusion-exclusion identities and inequalities and importance sampling , 1997 .

[25]  R. Kohn,et al.  Nonparametric regression using Bayesian variable selection , 1996 .

[26]  J. Hart,et al.  Kernel Regression Estimation Using Repeated Measurements Data , 1986 .

[27]  Simultaneous non-parametric regressions ofunbalanced longitudinal , 1997 .

[28]  Jianhua Z. Huang,et al.  Free knot splines in concave extended linear modeling , 2002 .

[29]  Jianqing Fan,et al.  Fast Implementations of Nonparametric Curve Estimators , 1994 .

[30]  Colin O. Wu,et al.  Nonparametric Mixed Effects Models for Unequally Sampled Noisy Curves , 2001, Biometrics.

[31]  Jianhua Z. Huang CONCAVE EXTENDED LINEAR MODELING: A THEORETICAL SYNTHESIS , 2001 .

[32]  J. Hart,et al.  Consistency of cross-validation when the data are curves , 1993 .

[33]  Jianhua Z. Huang Projection estimation in multiple regression with application to functional ANOVA models , 1998 .

[34]  Lee-Jen Wei,et al.  Inferences for a semiparametric model with panel data , 2000 .

[35]  Chin-Tsang Chiang,et al.  Asymptotic Confidence Regions for Kernel Smoothing of a Varying-Coefficient Model With Longitudinal Data , 1998 .

[36]  Young K. Truong,et al.  Polynomial splines and their tensor products in extended linear modeling: 1994 Wald memorial lecture , 1997 .

[37]  Jianhua Z. Huang Local asymptotics for polynomial spline regression , 2003 .

[38]  Ana Ivelisse Avilés,et al.  Linear Mixed Models for Longitudinal Data , 2001, Technometrics.

[39]  George G. Lorentz,et al.  Constructive Approximation , 1993, Grundlehren der mathematischen Wissenschaften.

[40]  Chin-Tsang Chiang,et al.  A Two-Step Smoothing Method for Varying-Coefficient Models with Repeated Measurements , 2000 .

[41]  P. Diggle Analysis of Longitudinal Data , 1995 .

[42]  M. Hansen,et al.  Spline Adaptation in Extended Linear Models , 1998 .

[43]  L. Schumaker Spline Functions: Basic Theory , 1981 .