Estimating linear mixed effect models with non-normal random effects through saddlepoint approximation and its application in retail pricing analytics

IF 1.2 4区 数学 Q2 STATISTICS & PROBABILITY Journal of Applied Statistics Pub Date : 2023-09-24 DOI:10.1080/02664763.2023.2260576
Hao Chen, Lanshan Han, Alvin Lim
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引用次数: 0

Abstract

ABSTRACTLinear Mixed Effects (LME) models are powerful statistical tools that have been employed in many different real-world applications such as retail data analytics, marketing measurement, and medical research. Statistical inference is often conducted via maximum likelihood estimation with Normality assumptions on the random effects. Nevertheless, for many applications in the retail industry, it is often necessary to consider non-Normal distributions on the random effects when considering the unknown parameters' business interpretations. Motivated by this need, a linear mixed effects model with possibly non-Normal distribution is studied in this research. We propose a general estimating framework based on a saddlepoint approximation (SA) of the probability density function of the dependent variable, which leads to constrained nonlinear optimization problems. The classical LME model with Normality assumption can then be viewed as a special case under the proposed general SA framework. Compared with the existing approach, the proposed method enhances the real-world interpretability of the estimates with satisfactory model fits.KEYWORDS: Mixed effects modellinear regressionconstrained optimizationstatistical inferencesaddlepoint approximationMATHEMATICAL SUBJECT CLASSIFICATION: 62J05 Disclosure statementNo potential conflict of interest was reported by the author(s).
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鞍点近似估计非正态随机线性混合效应模型及其在零售价格分析中的应用
摘要线性混合效应(LME)模型是一种强大的统计工具,已被应用于许多不同的现实世界应用,如零售数据分析、营销测量和医学研究。统计推断通常通过对随机效应的正态性假设进行极大似然估计来进行。然而,在零售业的许多应用中,在考虑未知参数的业务解释时,往往需要考虑随机效应的非正态分布。基于这种需要,本文研究了一个可能为非正态分布的线性混合效应模型。本文提出了一种基于因变量概率密度函数鞍点近似(SA)的通用估计框架,用于求解约束非线性优化问题。因此,具有正态性假设的经典LME模型可以被视为在所提出的通用SA框架下的特例。与现有方法相比,该方法提高了估计的真实可解释性,模型拟合满意。关键词:混合效应模型线性回归约束优化统计推断点近似数学主题分类:62J05披露声明作者未报告潜在利益冲突。
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来源期刊
Journal of Applied Statistics
Journal of Applied Statistics 数学-统计学与概率论
CiteScore
3.40
自引率
0.00%
发文量
126
审稿时长
6 months
期刊介绍: Journal of Applied Statistics provides a forum for communication between both applied statisticians and users of applied statistical techniques across a wide range of disciplines. These areas include business, computing, economics, ecology, education, management, medicine, operational research and sociology, but papers from other areas are also considered. The editorial policy is to publish rigorous but clear and accessible papers on applied techniques. Purely theoretical papers are avoided but those on theoretical developments which clearly demonstrate significant applied potential are welcomed. Each paper is submitted to at least two independent referees.
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