Department of Epidemiology and Biostatistics, University of Maryland, College Park, MD, USA.
Stat Med. 2010 Mar 30;29(7-8):896-905. doi: 10.1002/sim.3808.
Time-to-event data with time-varying covariates pose an interesting challenge for statistical modeling and inference, especially where the data require a regression structure but are not consistent with the proportional hazard assumption. Threshold regression (TR) is a relatively new methodology based on the concept that degradation or deterioration of a subject's health follows a stochastic process and failure occurs when the process first reaches a failure state or threshold (a first-hitting-time). Survival data with time-varying covariates consist of sequential observations on the level of degradation and/or on covariates of the subject, prior to the occurrence of the failure event. Encounters with this type of data structure abound in practical settings for survival analysis and there is a pressing need for simple regression methods to handle the longitudinal aspect of the data. Using a Markov property to decompose a longitudinal record into a series of single records is one strategy for dealing with this type of data. This study looks at the theoretical conditions for which this Markov approach is valid. The approach is called threshold regression with Markov decomposition or Markov TR for short. A number of important special cases, such as data with unevenly spaced time points and competing risks as stopping modes, are discussed. We show that a proportional hazards regression model with time-varying covariates is consistent with the Markov TR model. The Markov TR procedure is illustrated by a case application to a study of lung cancer risk. The procedure is also shown to be consistent with the use of an alternative time scale. Finally, we present the connection of the procedure to the concept of a collapsible survival model.
具有时变协变量的生存数据对统计建模和推断提出了一个有趣的挑战,尤其是在数据需要回归结构但不符合比例风险假设的情况下。门限回归(TR)是一种相对较新的方法,基于这样的概念,即主体健康的退化或恶化遵循随机过程,并且当过程首次达到失效状态或门限时(首次击中时间)就会发生失效。具有时变协变量的生存数据由在失效事件发生之前对主体的退化水平和/或协变量的连续观测组成。在生存分析的实际设置中,这种类型的数据结构比比皆是,因此迫切需要简单的回归方法来处理数据的纵向方面。使用马尔可夫属性将纵向记录分解为一系列单个记录是处理此类数据的一种策略。本研究探讨了这种马尔可夫方法有效的理论条件。该方法称为具有马尔可夫分解的门限回归或简称马尔可夫 TR。讨论了一些重要的特殊情况,例如时间点不均匀间隔的数据和竞争风险作为停止模式。我们表明,具有时变协变量的比例风险回归模型与马尔可夫 TR 模型一致。马尔可夫 TR 过程通过对肺癌风险研究的案例应用来说明。还表明该过程与替代时间尺度的使用一致。最后,我们介绍了该过程与可折叠生存模型概念的联系。