Your search keyword '"Guastadisegni L."' showing total 3 results

1. The asymptotic power of the Lagrange multiplier tests for misspecified IRT models

Author

Silvia Cagnone, Lucia Guastadisegni, Vassilis G. S. Vasdekis, Irini Moustaki, Wiberg, Marie, Molenaar, Dylan, González, Jorge, Böckenholt, Ulf, Kim, Jee-Seon, Wiberg M., Molenaar D., González J., Böckenholt U., Kim J.S., Guastadisegni L., Cagnone S., Moustaki I., and Vadeskis I

Subjects

Score test, BF Psychology, MIMIC model, Asymptotic distribution, Latent variable, Power (physics), symbols.namesake, Lagrange multiplier, Binary data, Item response theory, symbols, Applied mathematics, HA Statistics, Generalized lagrange multiplier test, Noncentrality parameter, Mathematics

Abstract

This article studies the power of the Lagrange Multiplier Test and the Generalized Lagrange Multiplier Test to detect measurement non-invariance in Item Response Theory (IRT) models for binary data. We study the performance of these two tests under correct model specification and incorrect distribution of the latent variable. The asymptotic distribution of each test under the alternative hypothesis depends on a noncentrality parameter that is used to compute the power. We present two different procedures to compute the noncentrality parameter and consequently the power of the tests. The performance of the two methods is evaluated through a simulation study. They turn out to be very similar to the classic empirical power but less time consuming. Moreover, the results highlight that the Lagrange Multiplier Test is more powerful than the Generalized Lagrange Multiplier Test to detect measurement non-invariance under all simulation conditions.

Published

2021

2. The generalized Hausman test for detecting non-normality in the latent variable distribution of the two-parameter IRT model.

Author

Guastadisegni L, Cagnone S, Moustaki I, and Vasdekis V

Abstract

This paper introduces the generalized Hausman test as a novel method for detecting the non-normality of the latent variable distribution of the unidimensional latent trait model for binary data. The test utilizes the pairwise maximum likelihood estimator for the parameters of the latent trait model, which assumes normality of the latent variable, and the maximum likelihood estimator obtained under a semi-non-parametric framework, allowing for a more flexible distribution of the latent variable. The performance of the generalized Hausman test is evaluated through a simulation study and compared with other test statistics available in the literature for testing latent variable distribution fit and an overall goodness-of-fit test statistic. Additionally, three information criteria are used to select the best-fitted model. The simulation results show that the generalized Hausman test outperforms the other tests under most conditions. However, the results obtained from the information criteria are somewhat contradictory under certain conditions, suggesting a need for further investigation and interpretation. The proposed test statistics are used in three datasets., (© 2024 The Author(s). British Journal of Mathematical and Statistical Psychology published by John Wiley & Sons Ltd on behalf of British Psychological Society.)

Published

2024

3. Use of the Lagrange Multiplier Test for Assessing Measurement Invariance Under Model Misspecification.

Author

Guastadisegni L, Cagnone S, Moustaki I, and Vasdekis V

Abstract

This article studies the Type I error, false positive rates, and power of four versions of the Lagrange multiplier test to detect measurement noninvariance in item response theory (IRT) models for binary data under model misspecification. The tests considered are the Lagrange multiplier test computed with the Hessian and cross-product approach, the generalized Lagrange multiplier test and the generalized jackknife score test. The two model misspecifications are those of local dependence among items and nonnormal distribution of the latent variable. The power of the tests is computed in two ways, empirically through Monte Carlo simulation methods and asymptotically, using the asymptotic distribution of each test under the alternative hypothesis. The performance of these tests is evaluated by means of a simulation study. The results highlight that, under mild model misspecification, all tests have good performance while, under strong model misspecification, the tests performance deteriorates, especially for false positive rates under local dependence and power for small sample size under misspecification of the latent variable distribution. In general, the Lagrange multiplier test computed with the Hessian approach and the generalized Lagrange multiplier test have better performance in terms of false positive rates while the Lagrange multiplier test computed with the cross-product approach has the highest power for small sample sizes. The asymptotic power turns out to be a good alternative to the classic empirical power because it is less time consuming. The Lagrange tests studied here have been also applied to a real data set., Competing Interests: Declaration of Conflicting Interests: The authors declared no potential conflicts of interest with respect to the research, authorship, and/or publication of this article., (© The Author(s) 2021.)

Published

2022