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- Q7449567 subject Q6585116.
- Q7449567 subject Q7452041.
- Q7449567 abstract "In order theory, a branch of mathematics, a semiorder is a type of ordering that may be determined for a set of items with numerical scores by declaring two items to be incomparable when their scores are within a given margin of error of each other, and by using the numerical comparison of their scores when those scores are sufficiently far apart. Semiorders were introduced and applied in mathematical psychology by Luce (1956) as a model of human preference without the assumption that indifference is transitive. They generalize strict weak orderings, form a special case of partial orders and interval orders, and can be characterized among the partial orders by two forbidden four-item suborders.".
- Q7449567 thumbnail Semiorder.svg?width=300.
- Q7449567 wikiPageWikiLink Q1069998.
- Q7449567 wikiPageWikiLink Q1128796.
- Q7449567 wikiPageWikiLink Q12916.
- Q7449567 wikiPageWikiLink Q130901.
- Q7449567 wikiPageWikiLink Q1352827.
- Q7449567 wikiPageWikiLink Q1414271.
- Q7449567 wikiPageWikiLink Q17098085.
- Q7449567 wikiPageWikiLink Q1908389.
- Q7449567 wikiPageWikiLink Q270513.
- Q7449567 wikiPageWikiLink Q369377.
- Q7449567 wikiPageWikiLink Q4545863.
- Q7449567 wikiPageWikiLink Q466707.
- Q7449567 wikiPageWikiLink Q474715.
- Q7449567 wikiPageWikiLink Q5155607.
- Q7449567 wikiPageWikiLink Q5693708.
- Q7449567 wikiPageWikiLink Q583760.
- Q7449567 wikiPageWikiLink Q6057290.
- Q7449567 wikiPageWikiLink Q621850.
- Q7449567 wikiPageWikiLink Q64861.
- Q7449567 wikiPageWikiLink Q6553442.
- Q7449567 wikiPageWikiLink Q6585116.
- Q7449567 wikiPageWikiLink Q7100431.
- Q7449567 wikiPageWikiLink Q7452041.
- Q7449567 wikiPageWikiLink Q835942.
- Q7449567 comment "In order theory, a branch of mathematics, a semiorder is a type of ordering that may be determined for a set of items with numerical scores by declaring two items to be incomparable when their scores are within a given margin of error of each other, and by using the numerical comparison of their scores when those scores are sufficiently far apart.".
- Q7449567 label "Semiorder".
- Q7449567 depiction Semiorder.svg.