Semiparametric analysis of short-term and long-term hazard ratios with two-sample survival data
Standard approaches to semiparametric modelling of two-sample survival data are not appropriate when the two survival curves cross. We introduce a two-sample model that accommodates crossing survival curves. The two scalar parameters of the model have the interpretations of being the short-term and long-term hazard ratios respectively. The time-varying hazard ratio is expressed semiparametrically by the two scalar parameters and an unspecified baseline distribution. The new model includes the Cox model and the proportional odds model as submodels. For inference we use a pseudo maximum likelihood approach that can be expressed via some simple estimating equations, analogous to that for the maximum partial likelihood estimator of the Cox model, that provide consistent and asymptotically normal estimators. Simulation studies show that the estimators perform well for moderate sample sizes. We also illustrate the methods with a real-data example. The new model can be extended easily to the regression setting. Copyright 2005, Oxford University Press.
Year of publication: |
2005
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Authors: | Yang, Song ; Prentice, Ross |
Published in: |
Biometrika. - Biometrika Trust, ISSN 0006-3444. - Vol. 92.2005, 1, p. 1-17
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Publisher: |
Biometrika Trust |
Saved in:
Online Resource
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