"순서론"의 두 판 사이의 차이

노트

위키데이터

• ID : Q1069998

말뭉치

1. ∈ R, if, x ≥ y defined on the set of +ve integers is a partial order relation.^[1]
2. : Show that the relation 'Divides' defined on N is a partial order relation.^[1]
3. Thus, the relation being reflexive, antisymmetric and transitive, the relation 'divides' is a partial order relation.^[1]
4. The set A together with a partial order relation R on the set A and is denoted by (A, R) is called a partial orders set or POSET.^[1]
5. A partial order on a set is a way of ordering its elements to say that some elements precede others, but allowing for the possibility that two elements may be incomparable without being the same.^[2]
6. The set of events in special relativity is described by a partial order.^[3]
7. Example 2 Determine whether the relation \(R\) represented by the matrix is a partial order.^[3]
8. Prove that \(R^{-1}\) is also a partial order.^[3]
9. Determine whether the relation \(R\) represented by the matrix is a partial order.^[3]
10. The relation itself is called a "partial order.^[4]
11. The word partial in the names "partial order" and "partially ordered set" is used as an indication that not every pair of elements needs to be comparable.^[4]
12. A set with a partial order is called a partially ordered set (also called a poset).^[4]
13. In some contexts, the partial order defined above is called a non-strict (or reflexive) partial order.^[4]
14. For a partial order, the size of the longest chain (antichain) is called the partial order length (partial order width).^[5]
15. A partial order, being a relation, can be represented by a di-graph.^[6]
16. Furthermore if is in the partial order, then remove the edge .^[6]
17. This packages provides the PartialOrd typeclass suitable for types admitting a partial order.^[7]
18. Provide a means for traversing through the partial order in a regular manner ( e .^[8]
19. Here \(w \le n\) is the width of the partial-order–a natural obstacle in searching a partial order.^[9]
20. Partial order There are two kinds of partial orders we can define - weak and strong.^[10]
21. The weak partial order is the more common one, so let's start with that.^[10]
22. Whenever I'm saying just "partial order", I'll mean a weak partial order.^[10]
23. The operator < on numbers is an example of strict partial order, since it satisfies all the properties; while \le is reflexive, < is irreflexive.^[10]
24. In this article, we define partial order relations on classifiers and families of classifiers, based on rankings of rate function values and rankings of test function values, respectively.^[11]
25. Each partial order relation provides a sufficient condition, which yields better classification error rates or better performance on the receiver operating characteristic analysis.^[11]

소스

메타데이터

위키데이터

• ID : Q1069998

Spacy 패턴 목록

• [{'LOWER': 'partial'}, {'LEMMA': 'order'}]
• [{'LOWER': 'ordering'}, {'LEMMA': 'relation'}]
• [{'LOWER': 'non'}, {'LOWER': '-'}, {'LOWER': 'strict'}, {'LEMMA': 'order'}]
• [{'LOWER': 'reflexive'}, {'LEMMA': 'order'}]
• [{'LOWER': 'non'}, {'LOWER': '-'}, {'LOWER': 'strict'}, {'LOWER': 'partial'}, {'LEMMA': 'order'}]
• [{'LOWER': 'reflexive'}, {'LOWER': 'partial'}, {'LEMMA': 'order'}]