Proportional hazards regression with interval censored data using an inverse probability weight

The prevalence of interval censored data is increasing in medical studies due to the growing use of biomarkers to define a disease progression endpoint. Interval censoring results from periodic monitoring of the progression status. For example, disease progression is established in the interval between the clinic visit where progression is recorded and the prior clinic visit where there was no evidence of disease progression. A methodology is proposed for estimation and inference on the regression coefficients in the Cox proportional hazards model with interval censored data. The methodology is based on estimating equations and uses an inverse probability weight to select event time pairs where the ordering is unambiguous. Simulations are performed to examine the finite sample properties of the estimate and a colon cancer data set is used to demonstrate its performance relative to the conventional partial likelihood estimate that ignores the interval censoring.

[1]  Wei Pan Extending the Iterative Convex Minorant Algorithm to the Cox Model for Interval-Censored Data , 1999 .

[2]  Z. Ying,et al.  Analysis of transformation models with censored data , 1995 .

[3]  Jian Huang,et al.  Interval Censored Survival Data: A Review of Recent Progress , 1997 .

[4]  Ulrich Mansmann,et al.  intcox: Compendium to apply the iterative convex minorant algorithm to interval censored event data , 2004 .

[5]  Jon A. Wellner,et al.  A Hybrid Algorithm for Computation of the Nonparametric Maximum Likelihood Estimator from Censored Data , 1997 .

[6]  Zhiliang Ying,et al.  On the linear transformation model for censored data , 1998 .

[7]  W Pan,et al.  A Multiple Imputation Approach to Cox Regression with Interval‐Censored Data , 2000, Biometrics.

[8]  Rebecca A Betensky,et al.  A local likelihood proportional hazards model for interval censored data , 2002, Statistics in medicine.

[9]  D. Finkelstein,et al.  A proportional hazards model for interval-censored failure time data. , 1986, Biometrics.

[10]  L Ryan,et al.  Semiparametric Regression Analysis of Interval‐Censored Data , 2000, Biometrics.

[11]  Jianguo Sun,et al.  The Statistical Analysis of Interval-censored Failure Time Data , 2006 .

[12]  Somnath Datta,et al.  Inference Based on Imputed Failure Times for the Proportional Hazards Model with Interval-Censored Data , 1998 .

[13]  Joseph G. Ibrahim,et al.  Using auxiliary data for parameter estimation with non‐ignorably missing outcomes , 2001 .

[14]  Zhigang Zhang,et al.  Regression analysis of interval‐censored failure time data with linear transformation models , 2005 .

[15]  Linxiong Li,et al.  Rank Estimation of Log-Linear Regression with Interval-Censored Data , 2003, Lifetime data analysis.

[16]  Zhigang Zhang,et al.  Linear transformation models for interval-censored data , 2009 .

[17]  Klaus Langohr,et al.  Tutorial on methods for interval-censored data and their implementation in R , 2009 .

[18]  Kjell A. Doksum,et al.  Partial likelihood in transformation models with censored data , 1988 .

[19]  Robert Tibshirani,et al.  An Introduction to the Bootstrap , 1994 .

[20]  G. Satten Rank-based inference in the proportional hazards model for interval censored data , 1996 .

[21]  Thomas R. Fleming,et al.  Proceedings of the First Seattle Symposium in Biostatistics: Survival Analysis , 1997 .