A General Theorem and Proof for the Identification of Composed CFA Models.

IF 2.9 2区 心理学 Q1 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS Psychometrika Pub Date : 2023-12-01 Epub Date: 2023-09-19 DOI:10.1007/s11336-023-09933-6
R Maximilian Bee, Tobias Koch, Michael Eid
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Abstract

In this article, we present a general theorem and proof for the global identification of composed CFA models. They consist of identified submodels that are related only through covariances between their respective latent factors. Composed CFA models are frequently used in the analysis of multimethod data, longitudinal data, or multidimensional psychometric data. Firstly, our theorem enables researchers to reduce the problem of identifying the composed model to the problem of identifying the submodels and verifying the conditions given by our theorem. Secondly, we show that composed CFA models are globally identified if the primary models are reduced models such as the CT-C[Formula: see text] model or similar types of models. In contrast, composed CFA models that include non-reduced primary models can be globally underidentified for certain types of cross-model covariance assumptions. We discuss necessary and sufficient conditions for the global identification of arbitrary composed CFA models and provide a Python code to check the identification status for an illustrative example. The code we provide can be easily adapted to more complex models.

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组合CFA模型辨识的一个一般定理和证明。
本文给出了组合CFA模型全局辨识的一个一般定理和证明。它们由已识别的子模型组成,这些子模型仅通过其各自潜在因素之间的协变量而相关。组合的CFA模型经常用于分析多方法数据、纵向数据或多维心理测量数据。首先,我们的定理使研究人员能够将识别组合模型的问题简化为识别子模型并验证我们的定理给出的条件的问题。其次,我们表明,如果主要模型是简化模型,如CT-C[公式:见正文]模型或类似类型的模型,则组合的CFA模型是全局识别的。相反,对于某些类型的跨模型协方差假设,包括非约简主模型的组合CFA模型可能在全局上被低估。我们讨论了任意组合CFA模型全局识别的充要条件,并提供了一个Python代码来检查识别状态。我们提供的代码可以很容易地适应更复杂的模型。
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来源期刊
Psychometrika
Psychometrika 数学-数学跨学科应用
CiteScore
4.40
自引率
10.00%
发文量
72
审稿时长
>12 weeks
期刊介绍: The journal Psychometrika is devoted to the advancement of theory and methodology for behavioral data in psychology, education and the social and behavioral sciences generally. Its coverage is offered in two sections: Theory and Methods (T& M), and Application Reviews and Case Studies (ARCS). T&M articles present original research and reviews on the development of quantitative models, statistical methods, and mathematical techniques for evaluating data from psychology, the social and behavioral sciences and related fields. Application Reviews can be integrative, drawing together disparate methodologies for applications, or comparative and evaluative, discussing advantages and disadvantages of one or more methodologies in applications. Case Studies highlight methodology that deepens understanding of substantive phenomena through more informative data analysis, or more elegant data description.
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