Rankings as ordinal scale measurement results
| Parent link: | Metrology and Measurement Systems Vol. 13, iss. 1.— 2007.— P. 9-24 |
|---|---|
| Autore principale: | |
| Riassunto: | Title screen Rankings (or preference relations, or weak orders) are sometimes considered to be non-empirical, nonobjective, low-informative and, in principle, are not worthy to be titled measurements. A purpose of the paper is to demonstrate that the measurement result on the ordinal scale should be an entire (consensus) ranking of n objects ranked by m properties (or experts, or voters) in order of preference and the ranking is one of points of the weak orders space. The consensus relation that would give an integrative characterization of the initial rankings is one of strict (linear) order relations, which, in some sense, is nearest to every of the initial rankings. A recursive branch and bound measurement procedure for finding the consensus relation is described. An approach to consensus relation uncertainty assessment is discussed |
| Pubblicazione: |
2007
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| Soggetti: | |
| Accesso online: | http://metrology.pg.gda.pl/full/2007/M&MS_2007_009.pdf |
| Natura: | Elettronico Capitolo di libro |
| KOHA link: | https://koha.lib.tpu.ru/cgi-bin/koha/opac-detail.pl?biblionumber=668513 |
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| 200 | 1 | |a Rankings as ordinal scale measurement results |f S. V. Muravyov (Murav’ev) | |
| 300 | |a Title screen | ||
| 320 | |a References: 13 tit | ||
| 330 | |a Rankings (or preference relations, or weak orders) are sometimes considered to be non-empirical, nonobjective, low-informative and, in principle, are not worthy to be titled measurements. A purpose of the paper is to demonstrate that the measurement result on the ordinal scale should be an entire (consensus) ranking of n objects ranked by m properties (or experts, or voters) in order of preference and the ranking is one of points of the weak orders space. The consensus relation that would give an integrative characterization of the initial rankings is one of strict (linear) order relations, which, in some sense, is nearest to every of the initial rankings. A recursive branch and bound measurement procedure for finding the consensus relation is described. An approach to consensus relation uncertainty assessment is discussed | ||
| 461 | |t Metrology and Measurement Systems | ||
| 463 | |t Vol. 13, iss. 1 |v P. 9-24 |d 2007 | ||
| 610 | 1 | |a труды учёных ТПУ | |
| 610 | 1 | |a электронный ресурс | |
| 610 | 1 | |a ordinal scale | |
| 610 | 1 | |a weak order | |
| 610 | 1 | |a consensus relation | |
| 610 | 1 | |a recursive algorithm | |
| 610 | 1 | |a порядковые шкалы | |
| 610 | 1 | |a рекурсивные алгоритмы | |
| 700 | 1 | |a Muravyov (Murav’ev) |b S. V. |c specialist in the field of control and measurement equipment |c Professor of Tomsk Polytechnic University,Doctor of technical sciences |f 1954- |g Sergey Vasilyevich |9 15440 | |
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