Robust and efficient estimation in ordinal response models using the density power divergence
Article Type
Research Article
Publication Title
Statistics
Abstract
In real life, we frequently encounter ordinal variables depending upon independent covariates. The latent linear regression model is useful for modelling such data. One can find the model's parameters' maximum likelihood estimate (MLE). Though noted for its optimum properties, a small proportion of outliers may destabilize the MLE. This paper uses the minimum density power divergence estimate (MDPDE) as a robust alternative. The roles of different link functions are analysed in this context. We discuss their asymptotic properties in this setup. Unlike the MLE, the MDPDEs are robust for– lower values of the gross error sensitivity, and very high breakdown point. Also, the slope’s MDPDEs never implode. In simulation studies for pure data, MDPDEs perform almost as good as the MLE. However, the MDPDEs outperform the MLE in data contamination. Moreover, MDPDEs are very competitive with the other robust alternatives. Finally, this article is wrapped up with a real-data example. .
First Page
481
Last Page
520
DOI
10.1080/02331888.2024.2347329
Publication Date
1-1-2024
Recommended Citation
Pyne, Arijit; Roy, Subhrajyoty; Ghosh, Abhik; and Basu, Ayanendranath, "Robust and efficient estimation in ordinal response models using the density power divergence" (2024). Journal Articles. 5051.
https://digitalcommons.isical.ac.in/journal-articles/5051
Comments
Open Access; Green Open Access