Locally D- and A-Optimal Design Framework for Poisson Regression with Square Root Link function:

Tofan Biswal; Mahesh Kumar Panda; Gurjeet Singh Walia

doi:10.19139/soic-2310-5070-2843

Locally D- and A-Optimal Design Framework for Poisson Regression with Square Root Link function

Locally D- and A-Optimal Design for Poisson Model

Tofan Biswal ph.d scholar
Mahesh Kumar Panda
Gurjeet Singh Walia

DOI: https://doi.org/10.19139/soic-2310-5070-2843

Keywords: D- & A-optimal design, Information matrix, Link function, Poisson regression model, Equivalence theorem.

Abstract

The majority of the research articles on optimum experimental designs for generalized linear models focus on Poisson regression models with log-link function. In the generalized linear model (GLM) configuration, the information matrix depends on the unknown parameters of the model. In such a case, an experimenter must take the strategy of identifying local optimum designs i.e. first guessing the best value for the parameters and then calculating the optimal designs. In this article, we examine locally D- and A-optimal designs for a Poisson regression model using square root link function. The Equivalence theorem validates the necessary and sufficient conditions of this optimality criterion.

Published

2026-01-22

How to Cite

Biswal, T., Mahesh Kumar Panda, & Gurjeet Singh Walia. (2026). Locally D- and A-Optimal Design Framework for Poisson Regression with Square Root Link function. Statistics, Optimization & Information Computing. https://doi.org/10.19139/soic-2310-5070-2843

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Online First

Section

Research Articles

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