离散结果回归模型的双重概率积分变换残差

Double Probability Integral Transform Residuals for Regression Models with Discrete Outcomes

Journal of Computational and Graphical Statistics · 2024
被引 2
ABS 3

中文导读

针对离散结果(如序数或计数数据)回归模型,提出基于双重概率积分变换的新型残差,在连续协变量存在时近似服从均匀分布,可通过QQ图等工具评估模型拟合度并识别过离散等问题。

Abstract

The assessment of regression models with discrete outcomes is challenging and has many fundamental issues. With discrete outcomes, standard regression model assessment tools such as Pearson and deviance residuals do not follow the conventional reference distribution (normal) under the true model, calling into question the legitimacy of model assessment based on these tools. To fill this gap, we construct a new type of residuals for regression models with general discrete outcomes, including ordinal and count outcomes. The proposed residuals are based on two layers of probability integral transformation. When at least one continuous covariate is available, the proposed residuals closely follow a uniform distribution (or a normal distribution after transformation) under the correctly specified model. One can construct visualizations such as QQ plots to check the overall fit of a model straightforwardly, and the shape of QQ plots can further help identify possible causes of misspecification such as overdispersion. We provide theoretical justification for the proposed residuals by establishing their asymptotic properties. Moreover, in order to assess the mean structure and identify potential covariates, we develop an ordered curve as a supplementary tool, which is based on the comparison between the partial sum of outcomes and of fitted means. Through simulation, we demonstrate empirically that the proposed tools outperform commonly used residuals for various model assessment tasks. We also illustrate the workflow of model assessment using the proposed tools in data analysis. Supplementary materials for this article are available online.

回归分析离散数据模型诊断残差分析广义线性模型