AN OMNIBUS TEST FOR INDEPENDENCE OF A SURVIVAL-TIME FROM A COVARIATE
成果类型:
Article
署名作者:
MCKEAGUE, IW; NIKABADZE, AM; SUN, YQ
署名单位:
University of Rochester
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/aos/1176324530
发表日期:
1995
页码:
450-475
关键词:
counting-processes
regression-models
Weak Convergence
martingales
parameter
GOODNESS
摘要:
It has been over 60 years since Kolmogorov introduced a distribution-free omnibus test for the simple null hypothesis that a distribution function coincides with a given distribution function. Doob subsequently observed that Kolmogorov's approach could be simplified by transforming the empirical process to an empirical process based on uniform random variables. Recent use of more sophisticated transformations has led, to the construction of asymptotically distribution-free omnibus tests when unknown parameters are present. The purpose of the present paper is to use the transformation approach to construct an asymptotically distribution-free omnibus test for independence of a survival time from a covariate. The test statistic is obtained from a certain test statistic process (indexed by time and covariate), which is shown to converge in distribution to a Brownian sheet. A simulation study is carried out to investigate the finite sample properties of the proposed test and an application to data from the British Medical Research Council's 4th myelomatosis trial is given.
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