Identifying local dependence with a score test statistic based on the bifactor 2-parameter logistic model Public Deposited
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- Last Modified
- March 20, 2019
- Affiliation: College of Arts and Sciences, Department of Psychology and Neuroscience
- Local dependence (LD) refers to the violation of the local independence assumption of most item response models. Statistics that indicate LD between a pair of items on a test or questionnaire that is being fitted with an item response model can play a useful diagnostic role in applications of item response theory. In this paper a new score test statistic, S?b?, for underlying LD (ULD) is proposed based on the bifactor 2-parameter logistic model. To compare the performance of S?b? with the score test statistic (St) based on a threshold shift model for surface LD (SLD), and the LD X2 statistic, we simulated data under null, ULD, and SLD conditions, and evaluated the null distribution and power of each of these test statistics. The results summarize the null distributions of all three diagnostic statistics, and their power for approximately matched degrees of ULD and SLD. Future research directions are discussed, including the straightforward generalization of Sb for polytomous item response models, and the challenges involved in the corresponding generalizations of St and LD X2.
- Date of publication
- December 2011
- Resource type
- Rights statement
- In Copyright
- "... in partial fulfillment of the requirements for the degree of Master of Arts in the Department of Psychology."
- Thissen, David
- Place of publication
- Chapel Hill, NC
- Open access
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|Identifying local dependence with a score test statistic based on the bifactor 2-parameter logistic model||2019-04-11||Public||