partially ordered set

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partially ordered set

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partially ordered set (plural partially ordered sets)

(set theory, order theory, loosely) A set that has a given, elsewhere specified partial order.
(set theory, order theory, formally) The ordered pair comprising a set and its partial order.
- 1959 [D. Van Nostrand], Edward James McShane, Truman Arthur Botts, Real Analysis, 2005, Dover, page 28,
  A partially ordered set means a pair $(P,\succ )$ consisting of a set $P$ and a partial order $\succ$ in $P$ . As usual, when the meaning is clear, we may suppress the notation of " $\succ$ " and speak of the partially ordered set $P$ .
  
  The ordered fields defined earlier are easily seen to be examples of partially ordered sets.
- 1994, I. V. Evstigneev, P. E. Greenwood, Markov Fields over Countable Partially Ordered Sets: Extrema and Splitting, American Mathematical Society, page 35:
  In sections 7-10 we shall consider random fields over some subsets T of the partially ordered set T_M.
- 2000, David Arnold, Abelian Groups and Representations of Finite Partially Ordered Sets, Springer, page 45:
  The invention of a derivative of a finite partially ordered set by Nazarova and Roiter in the late 1960s or early 1970s was a seminal event in the subject of representations of finite partially ordered sets (see [Simson 92]).

The two senses are commonly used interchangeably, there rarely being a need to distinguish between them.
The components of the ordered pair may be referred to separately as the ground set and partial order.

set having a specified partial order

Arabic: (Arabic Academy term) فِئَةٌ مُرَتَّبَةٌ جُزْئِيًّا f (fiʔatun murattabatun juzʔiyyan), (common in educational communities) مَجْمُوعَةٌ مُرَتَّبَةٌ جُزْئِيًّا f (majmūʕatun murattabatun juzʔiyyan)
Czech: uspořádaná množina f
Finnish: osittain järjestetty joukko
German: partiell geordnete Menge f
Japanese: 半順序集合 (はんじゅんじょしゅうごう, hanjunjo-shūgō)
Swedish: partiellt ordnad mängd (sv) c