preorder
See also: pre-order
English
editEtymology
editVerb
editpreorder (third-person singular simple present preorders, present participle preordering, simple past and past participle preordered)
- (transitive) To order (goods or services) in advance, before they are available.
- (transitive) To sort or arrange beforehand.
Translations
editto order in advance
|
Noun
editpreorder (plural preorders)
- An order for goods or services placed in advance.
- (set theory, order theory) A binary relation that is reflexive and transitive.
- The relation of logical implication over sentences is an example of a preorder.
- 2002, Yves Nievergelt, Foundations of Logic and Mathematics[1], Springer (Birkhäuser), page 152:
- Example 436 For each set , the relation is a preorder on .
- 2010, S. Kaci, “Refined Preference-Based Argumentation Frameworks”, in Pietro Baroni, F. Cerutti, M. Giacomin, G. R. Simari, editors, Computational Models of Argument: Proceedings of COMMA 2010, IOS Press, page 306:
- Let us first compare , and w.r.t. the partial preorder .
- 2000, Jean-Charles Pomerol, Sergio Barba-Romero, Multicriterion Decision in Management: Principles and Practice, Springer, Softcover, page 58,
- It can easily be verified that the above relation is a preorder, i.e. that it is reflexive and transitive.
Synonyms
edit- (binary relation that is reflexive and transitive): quasiorder
Hyponyms
edit- (binary relation that is reflexive and transitive):
Derived terms
editRelated terms
editTranslations
editorder in advance
|
binary relation
|
Adjective
editpreorder (not comparable)
- (computing theory, of a traversal of a tree) Such that, recursively, the root is visited before the left and right subtrees.
- 2002, Gabriel Valiente, Algorithms on Trees and Graphs, Springer, page 115:
- Now, the preorder traversal of a tree can be constructed from the preorder traversals of the subtrees rooted at the children of the root of the tree.
- 2006, ISRD Group, Data Structures Using C, Tata McGraw-Hill Education, page 254:
- In the program given above, tree is constructed and is traversed in inorder, preorder and postorder traversal.
- 2011, Ananda Rao Akepogu, Radhika Raju Palagiri, Data Structures and Algorithms Using C++, Pearson Education India, page 9.16,
- The preorder traversal visits a node first after which it traverses its left subtree and then traverses its right subtree.