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http://hdl.handle.net/20.500.12188/31518| Title: | PROPRETIES OF THE K-TH UPPER ORDER STATISTICS PROCESS THROUGH AN EXAMPLE | Authors: | Aneta Gacovska-Barandovska | Keywords: | Upper order statistic, fixed rank, central rank, regular norming sequence, random sample size, time-space changes. | Issue Date: | 2019 | Publisher: | Union of Mathematicians of Macedonia | Source: | Aneta Gacovska-Barandovska, PROPRETIES OF THE K-TH UPPER ORDER STATISTICS PROCESS THROUGH AN EXAMPLE, Mat.Bilten, 43 (LXIX) 2, , p.61-72, (2019). | Journal: | Математички билтен / Matematichki bilten / BULLETIN MATHÉMATIQUE DE LA SOCIÉTÉ DES MATHÉMATICIENS DE LA RÉPUBLIQUE MACÉDOINE | Series/Report no.: | 43;2 | Abstract: | The author has previously considered the asymptotic be havior of upper order statistics with central rank of a sample with deterministic size and of randomly indexed upper order statistics. In this paper, by using regular norming time-space changes, a theoretical example has been constructed in order to illustrate some of the ob tained properties of the k-th upper order statistics process. | URI: | http://hdl.handle.net/20.500.12188/31518 | DOI: | 10.37560/matbil2190061gb |
| Appears in Collections: | Faculty of Natural Sciences and Mathematics, Institute of Mathematics: Journal Articles |
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| 43-69-2-2019-61-72.pdf | 438.94 kB | Adobe PDF | View/Open |
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