A Dynamic Generalization of the Rasch Model
N. D. Verhelst; C. A. W. Glas; Cees A. W. Glas
In the present paper a model for describing dynamic processes is constructed by combining the common Rasch model with the concept of structurally incomplete designs. This is accomplished by mapping each item on a collection of virtual items, one of which is assumed to be presented to the respondent dependent on the preceding responses and/or the feedback obtained. It is shown that, in the case of subject control, no unique conditional maximum likelihood (CML) estimates exist, whereas marginal maximum likelihood (MML) proves a suitable estimation procedure. A hierarchical family of dynamic models is presented, and it is shown how to test special cases against more general ones. Furthermore, it is shown that the model presented is a generalization of a class of mathematical learning models, known as Luce's beta-model.
N. D. Verhelst, C. A. W. Glas, & Cees A. W. Glas (1993). A Dynamic Generalization of the Rasch Model. Psychometrika, 58(3), 395-415. https://doi.org/10.1007/bf02294648