AUTHOR=Purwar Neha , Aditya Kaustav , B  , Das Pankaj , Ahmad Tauqueer 

TITLE=Neutrosophic regression type estimator for the finite population mean and its applications in real data scenarios

JOURNAL=Frontiers in Applied Mathematics and Statistics

VOLUME=Volume 11 - 2025

YEAR=2025

URL=https://www.frontiersin.org/journals/applied-mathematics-and-statistics/articles/10.3389/fams.2025.1658157

DOI=10.3389/fams.2025.1658157

ISSN=2297-4687

ABSTRACT=Research under classical statistics often relies on precise, determinate data to estimate population parameters. However, in certain situations, data may be indeterminate or imprecise. Neutrosophic statistics, a generalization of classical statistics, has been introduced to address these challenges by handling vague, indeterminate, and uncertain information effectively. Several estimators, including ratio estimators, have been proposed in neutrosophic statistics. These ratio estimators perform well when the correlation between the auxiliary and study variables is strong. However, in this study, regression-type estimators were developed, demonstrating superior performance in cases where the correlation between the study and auxiliary variables is high, weak, or moderate. The performance of the proposed estimator was evaluated using simulated data as well as four real-world datasets with indeterminate data, including blood pressure, temperature, natural growth rate, and solar energy data. The proposed neutrosophic regression estimator consistently outperformed the existing neutrosophic ratio estimator, modified neutrosophic ratio estimators, and the neutrosophic exponential ratio estimator, as indicated by performance measures such as mean squared error (MSE) and percent relative efficiency (PRE). This paper highlights the advantages of the neutrosophic regression estimator in improving estimation accuracy when dealing with uncertain and ambiguous data, with any range of correlation between the study and the auxiliary variables considered under the study.