Parametric tests of perfect judgment ranking based on ordered ranked set samples

Zamanzade, Ehsan; Vock, Michael (2018). Parametric tests of perfect judgment ranking based on ordered ranked set samples. REVSTAT - statistical journal, 16(4), pp. 463-474. Instituto Nacional de Estatística

Full text not available from this repository. (Request a copy)

We develop parametric and location-scale free tests of perfect judgment ranking based on ordered ranked set samples. The tests are based on the differences between the elements of the ordered ranked set samples and those of the original ranked set samples. We compare our proposed tests with the best existing tests of perfect judgment ranking in the literature by using Monte Carlo simulation. Our simulation results show that the proposed tests behave favorably in comparison with their leading competitors, especially under the fraction of neighbor rankings model. In comparison to the nonparametric competitors, the proposed tests have the advantage of not needing randomization to attain a specific size.

Item Type:	Journal Article (Original Article)
Division/Institute:	08 Faculty of Science > Department of Mathematics and Statistics > Institute of Mathematical Statistics and Actuarial Science
UniBE Contributor:	Zamanzade, Ehsan, Vock, Michael Peter
Subjects:	500 Science > 510 Mathematics
ISSN:	1645-6726
Publisher:	Instituto Nacional de Estatística
Language:	English
Submitter:	Michael Peter Vock
Date Deposited:	20 Mar 2018 12:58
Last Modified:	02 Mar 2023 23:30
Related URLs:	Publication
URI:	https://boris.unibe.ch/id/eprint/112943