基于 Mantel-Haenszel 差异项目功能效应大小测量的 Rasch 树新停止标准。

IF 2.1 3区 心理学 Q2 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
Educational and Psychological Measurement Pub Date : 2023-02-01 Epub Date: 2022-02-28 DOI:10.1177/00131644221077135
Mirka Henninger, Rudolf Debelak, Carolin Strobl
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引用次数: 0

摘要

为了检测差异项目功能(DIF),拉氏树在协变量中搜索最佳分割点,并以数据驱动的方式识别受访者子群。Rasch 树使用统计显著性检验来确定是否以及在哪个协变量中进行拆分。因此,在较大样本中,Rasch 树更有可能将较小的 DIF 效应标注为显著。这就会产生更大的树,将样本分成更多的子组。更理想的方法是更多地由效应大小而不是样本大小驱动。为了实现这一目标,我们建议采用一种额外的停止标准:基于曼特尔-海恩泽尔几率比率的教育考试服务(ETS)分类计划。该标准可帮助我们评估 Rasch 树中的分叉是基于项目参数的实质性差异还是可忽略的差异,并允许 Rasch 树在已识别子组之间的 DIF 较小时停止增长。此外,它还支持识别 DIF 项目并量化每个分拆中的 DIF 效应大小。根据模拟结果,我们得出结论:在零假设下,或当样本量较大但 DIF 效应可忽略不计时,Mantel-Haenszel 效应大小可进一步减少 Rasch 树中不必要的拆分。最后,我们讨论了如何解释 Rasch 树中不同节点之间的 DIF 效应,并强调了 Mantel-Haenszel 程序的净化策略对于树停止和 DIF 项目分类的重要性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

A New Stopping Criterion for Rasch Trees Based on the Mantel-Haenszel Effect Size Measure for Differential Item Functioning.

A New Stopping Criterion for Rasch Trees Based on the Mantel-Haenszel Effect Size Measure for Differential Item Functioning.

A New Stopping Criterion for Rasch Trees Based on the Mantel-Haenszel Effect Size Measure for Differential Item Functioning.

A New Stopping Criterion for Rasch Trees Based on the Mantel-Haenszel Effect Size Measure for Differential Item Functioning.

To detect differential item functioning (DIF), Rasch trees search for optimal splitpoints in covariates and identify subgroups of respondents in a data-driven way. To determine whether and in which covariate a split should be performed, Rasch trees use statistical significance tests. Consequently, Rasch trees are more likely to label small DIF effects as significant in larger samples. This leads to larger trees, which split the sample into more subgroups. What would be more desirable is an approach that is driven more by effect size rather than sample size. In order to achieve this, we suggest to implement an additional stopping criterion: the popular Educational Testing Service (ETS) classification scheme based on the Mantel-Haenszel odds ratio. This criterion helps us to evaluate whether a split in a Rasch tree is based on a substantial or an ignorable difference in item parameters, and it allows the Rasch tree to stop growing when DIF between the identified subgroups is small. Furthermore, it supports identifying DIF items and quantifying DIF effect sizes in each split. Based on simulation results, we conclude that the Mantel-Haenszel effect size further reduces unnecessary splits in Rasch trees under the null hypothesis, or when the sample size is large but DIF effects are negligible. To make the stopping criterion easy-to-use for applied researchers, we have implemented the procedure in the statistical software R. Finally, we discuss how DIF effects between different nodes in a Rasch tree can be interpreted and emphasize the importance of purification strategies for the Mantel-Haenszel procedure on tree stopping and DIF item classification.

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来源期刊
Educational and Psychological Measurement
Educational and Psychological Measurement 医学-数学跨学科应用
CiteScore
5.50
自引率
7.40%
发文量
49
审稿时长
6-12 weeks
期刊介绍: Educational and Psychological Measurement (EPM) publishes referred scholarly work from all academic disciplines interested in the study of measurement theory, problems, and issues. Theoretical articles address new developments and techniques, and applied articles deal with innovation applications.
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