TL;DR
This paper introduces a flexible, comprehensive class of item response models capable of handling various response types, including continuous, binary, categorical, and count data, with adaptive difficulty functions.
Contribution
It proposes a unified modeling framework that generalizes existing models, allowing for mixed item formats and distribution-free count responses, enhancing flexibility and applicability.
Findings
Models encompass Rasch and graded response models as special cases.
Difficulty functions adapt automatically to response distributions.
Illustrated with real data demonstrating flexibility.
Abstract
A comprehensive class of models is proposed that can be used for continuous, binary, ordered categorical and count type responses. The difficulty of items is described by difficulty functions, which replace the item difficulty parameters that are typically used in item response models. They crucially determine the response distribution and make the models very flexible with regard to the range of distributions that are covered. The model class contains several widely used models as the binary Rasch model and the graded response model as special cases, allows for simplifications, and offers a distribution free alternative to count type items. A major strength of the models is that they can be used for mixed item formats, when different types of items are combined to measure abilities or attitudes. It is an immediate consequence of the comprehensive modeling approach that allows that…
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Taxonomy
TopicsPsychometric Methodologies and Testing · Advanced Statistical Modeling Techniques · Statistical Methods and Bayesian Inference