Robust function-on-function interaction regression

IF 1.2 4区数学 Q2 STATISTICS & PROBABILITY

Statistical Modelling Pub Date : 2023-10-23 DOI:10.1177/1471082x231198907

Ufuk Beyaztas, Han Lin Shang, Abhijit Mandal

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引用次数: 0

Abstract

A function-on-function regression model with quadratic and interaction effects of the covariates provides a more flexible model. Despite several attempts to estimate the model’s parameters, almost all existing estimation strategies are non-robust against outliers. Outliers in the quadratic and interaction effects may deteriorate the model structure more severely than their effects in the main effect. We propose a robust estimation strategy based on the robust functional principal component decomposition of the function-valued variables and [Formula: see text]-estimator. The performance of the proposed method relies on the truncation parameters in the robust functional principal component decomposition of the function-valued variables. A robust Bayesian information criterion is used to determine the optimum truncation constants. A forward stepwise variable selection procedure is employed to determine relevant main, quadratic, and interaction effects to address a possible model misspecification. The finite-sample performance of the proposed method is investigated via a series of Monte-Carlo experiments. The proposed method’s asymptotic consistency and influence function are also studied in the supplement, and its empirical performance is further investigated using a U.S. COVID-19 dataset.

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鲁棒函数对函数交互回归

具有二次效应和交互效应的函数对函数回归模型提供了一个更灵活的模型。尽管多次尝试估计模型的参数，但几乎所有现有的估计策略对异常值都是非鲁棒的。二次效应和交互效应中的异常值可能比主效应中的异常值更严重地恶化模型结构。我们提出了一种基于函数值变量的鲁棒泛函主成分分解和[公式:见文本]估计量的鲁棒估计策略。该方法的性能依赖于函数值变量鲁棒泛函主成分分解中的截断参数。采用鲁棒贝叶斯信息准则确定最佳截断常数。采用前向逐步变量选择程序来确定相关的主要、二次和交互效应，以解决可能的模型错误说明。通过一系列的蒙特卡罗实验研究了该方法的有限样本性能。本文还研究了该方法的渐近一致性和影响函数，并利用美国COVID-19数据集进一步研究了该方法的经验性能。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Statistical Modelling 数学-统计学与概率论

CiteScore

2.20

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The primary aim of the journal is to publish original and high-quality articles that recognize statistical modelling as the general framework for the application of statistical ideas. Submissions must reflect important developments, extensions, and applications in statistical modelling. The journal also encourages submissions that describe scientifically interesting, complex or novel statistical modelling aspects from a wide diversity of disciplines, and submissions that embrace the diversity of applied statistical modelling.