Bootstrap Tests and Confidence Intervals for a Hazard Ratio When the Number of Observed Failures is Small, With Applications to Group Sequential Survival Studies

We present a small sample approximation to the distribution of the efficient score statistic for testing the null hypothesis λ=λ 0, where λ is the hazard ratio in a proportional hazards model. Here, “small sample” refers to a small number of failures in the observed data. Our basic approximation is to the conditional distribution of observations’ group memberships, given the observed number of failures and number of censored observations between successive failures; the implied distribution of the score statistic is found by simulation. Our method can be incorporated into sequential procedures for monitoring survival data and it successfully overcomes inaccuracies in the usual normal approximations that arise when only a few subjects have failed at early analyses.

[1]  K. K. Lan,et al.  Stochastically curtailed tests in long–term clinical trials , 1982 .

[2]  M H Gail,et al.  Use of logrank tests and group sequential methods at fixed calendar times. , 1985, Biometrics.

[3]  Eric V. Slud,et al.  Two-Sample Repeated Significance Tests Based on the Modified Wilcoxon Statistic , 1982 .

[4]  G. Elfring,et al.  Multiple-stage procedures for drug screening. , 1973, Biometrics.

[5]  David P. Harrington,et al.  Procedures for Serial Testing in Censored Survival Data , 1984 .

[6]  Nancy Reid,et al.  Estimating the median survival time , 1981 .

[7]  S. Pocock Group sequential methods in the design and analysis of clinical trials , 1977 .

[8]  Rupert G. Miller,et al.  Survival Analysis , 2022, The SAGE Encyclopedia of Research Design.

[9]  Anastasios A. Tsiatis,et al.  Group sequential methods for survival analysis with staggered entry , 1982 .

[10]  Mitchell H. Gail,et al.  Simulation Studies on Increments of the Two-Sample Logrank Score Test for Survival Time Data, with Application to Group Sequential Boundaries , 1982 .

[11]  F. Marriott,et al.  Barnard's Monte Carlo Tests: How Many Simulations? , 1979 .

[12]  B. Efron Bootstrap Methods: Another Look at the Jackknife , 1979 .

[13]  B. M. Brown,et al.  Martingale Central Limit Theorems , 1971 .

[14]  David R. Cox,et al.  Regression models and life tables (with discussion , 1972 .

[15]  B. Turnbull,et al.  Repeated confidence intervals for group sequential clinical trials. , 1984, Controlled clinical trials.

[16]  Christopher Jennison,et al.  Exact calculations for sequential t, X2 and F tests , 1991 .

[17]  Bradley Efron,et al.  Censored Data and the Bootstrap , 1981 .

[18]  Anastasios A. Tsiatis,et al.  The asymptotic joint distribution of the efficient scores test for the proportional hazards model calculated over time , 1981 .