College of Medicine and Division of Health Care Policy and Research, Mayo Clinic, Rochester, Minnesota 55905, USA.
Health Econ. 2013 Sep;22(9):1052-70. doi: 10.1002/hec.2927. Epub 2013 Apr 25.
The quantile regression (QR) framework provides a pragmatic approach in understanding the differential impacts of covariates along the distribution of an outcome. However, the QR framework that has pervaded the applied economics literature is based on the conditional quantile regression method. It is used to assess the impact of a covariate on a quantile of the outcome conditional on specific values of other covariates. In most cases, conditional quantile regression may generate results that are often not generalizable or interpretable in a policy or population context. In contrast, the unconditional quantile regression method provides more interpretable results as it marginalizes the effect over the distributions of other covariates in the model. In this paper, the differences between these two regression frameworks are highlighted, both conceptually and econometrically. Additionally, using real-world claims data from a large US health insurer, alternative QR frameworks are implemented to assess the differential impacts of covariates along the distribution of medication adherence among elderly patients with Alzheimer's disease.
分位数回归(QR)框架为理解协变量在结果分布中的差异影响提供了一种实用方法。然而,在应用经济学文献中流行的 QR 框架是基于条件分位数回归方法的。它用于评估协变量对特定其他协变量值条件下的结果分位数的影响。在大多数情况下,条件分位数回归可能会生成结果,这些结果在政策或总体情况下通常不可推广或不可解释。相比之下,无条件分位数回归方法提供了更具可解释性的结果,因为它在模型中对其他协变量的分布进行了边缘效应处理。在本文中,从概念和计量经济学两个方面强调了这两种回归框架之间的差异。此外,还使用来自美国大型健康保险公司的真实索赔数据,实施了替代 QR 框架来评估在老年阿尔茨海默病患者药物依从性分布中协变量的差异影响。
