We need to change how we compute RMSEA for nested model comparisons in structural equation modeling.

IF 7.6 1区 心理学 Q1 PSYCHOLOGY, MULTIDISCIPLINARY
Psychological methods Pub Date : 2024-06-01 Epub Date: 2023-01-09 DOI:10.1037/met0000537
Victoria Savalei, Jordan C Brace, Rachel T Fouladi
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引用次数: 0

Abstract

Comparison of nested models is common in applications of structural equation modeling (SEM). When two models are nested, model comparison can be done via a chi-square difference test or by comparing indices of approximate fit. The advantage of fit indices is that they permit some amount of misspecification in the additional constraints imposed on the model, which is a more realistic scenario. The most popular index of approximate fit is the root mean square error of approximation (RMSEA). In this article, we argue that the dominant way of comparing RMSEA values for two nested models, which is simply taking their difference, is problematic and will often mask misfit, particularly in model comparisons with large initial degrees of freedom. We instead advocate computing the RMSEA associated with the chi-square difference test, which we call RMSEAD. We are not the first to propose this index, and we review numerous methodological articles that have suggested it. Nonetheless, these articles appear to have had little impact on actual practice. The modification of current practice that we call for may be particularly needed in the context of measurement invariance assessment. We illustrate the difference between the current approach and our advocated approach on three examples, where two involve multiple-group and longitudinal measurement invariance assessment and the third involves comparisons of models with different numbers of factors. We conclude with a discussion of recommendations and future research directions. (PsycInfo Database Record (c) 2024 APA, all rights reserved).

我们需要改变结构方程建模中嵌套模型比较的 RMSEA 计算方法。
在结构方程建模(SEM)的应用中,嵌套模型的比较很常见。当两个模型嵌套时,可以通过卡方差异检验或比较近似拟合指数来进行模型比较。拟合指数的优势在于,它们允许在对模型施加的额外约束条件中存在一定程度的错误规范,这是更现实的情况。最常用的近似拟合指数是近似均方根误差(RMSEA)。在本文中,我们认为比较两个嵌套模型 RMSEA 值的主流方法,即简单地取它们的差值,是有问题的,往往会掩盖不拟合,特别是在初始自由度较大的模型比较中。我们主张计算与卡方差检验相关的 RMSEA,我们称之为 RMSEAD。我们并不是第一个提出这一指标的人,我们回顾了许多提出这一指标的方法论文章。然而,这些文章似乎对实际操作影响甚微。在测量不变性评估方面,我们呼吁对当前实践进行修改,这可能是特别需要的。我们通过三个例子来说明当前方法与我们所提倡的方法之间的区别,其中两个例子涉及多组和纵向测量不变性评估,第三个例子涉及不同因子数量模型的比较。最后,我们对建议和未来研究方向进行了讨论。(PsycInfo Database Record (c) 2023 APA, 版权所有)。
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
Psychological methods
Psychological methods PSYCHOLOGY, MULTIDISCIPLINARY-
CiteScore
13.10
自引率
7.10%
发文量
159
期刊介绍: Psychological Methods is devoted to the development and dissemination of methods for collecting, analyzing, understanding, and interpreting psychological data. Its purpose is the dissemination of innovations in research design, measurement, methodology, and quantitative and qualitative analysis to the psychological community; its further purpose is to promote effective communication about related substantive and methodological issues. The audience is expected to be diverse and to include those who develop new procedures, those who are responsible for undergraduate and graduate training in design, measurement, and statistics, as well as those who employ those procedures in research.
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