A generalized single-index linear threshold model for identifying treatment-sensitive subsets based on multiple covariates and longitudinal measurements

Pub Date : 2022-10-17 DOI:10.1002/cjs.11737
Xinyi Ge, Yingwei Peng, Dongsheng Tu
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Abstract

Identification of a subset of patients who may be sensitive to a specific treatment is an important step towards personalized medicine. We consider the case where the effect of a treatment is assessed by longitudinal measurements, which may be continuous or categorical, such as quality of life scores assessed over the duration of a clinical trial. We assume that multiple baseline covariates, such as age and expression levels of genes, are available, and propose a generalized single-index linear threshold model to identify the treatment-sensitive subset and assess the treatment-by-subset interaction after combining these covariates. Because the model involves an indicator function with unknown parameters, conventional procedures are difficult to apply for inferences of the parameters in the model. We define smoothed generalized estimating equations and propose an inference procedure based on these equations with an efficient spectral algorithm to find their solutions. The proposed procedure is evaluated through simulation studies and an application to the analysis of data from a randomized clinical trial in advanced pancreatic cancer.

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一个广义的单指标线性阈值模型,用于识别基于多协变量和纵向测量的治疗敏感子集
识别可能对特定治疗敏感的患者子集是实现个性化医疗的重要一步。我们考虑通过纵向测量来评估治疗效果的情况,这可能是连续的或分类的,例如在临床试验期间评估的生活质量评分。我们假设存在多个基线协变量,如年龄和基因表达水平,并提出了一个广义的单指标线性阈值模型,以确定治疗敏感子集,并在组合这些协变量后评估治疗对子集的相互作用。由于模型中涉及一个参数未知的指标函数,常规的方法难以对模型中的参数进行推断。我们定义了光滑的广义估计方程,并提出了一个基于这些方程的推理程序,并使用有效的谱算法来求其解。通过模拟研究和应用于晚期胰腺癌随机临床试验的数据分析来评估拟议的程序。
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