Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Composition_(combinatorics)> ?p ?o }
Showing triples 1 to 42 of
42
with 100 triples per page.
- Composition_(combinatorics) abstract "In mathematics, a composition of an integer n is a way of writing n as the sum of a sequence of (strictly) positive integers. Two sequences that differ in the order of their terms define different compositions of their sum, while they are considered to define the same partition of that number. Every integer has finitely many distinct compositions. Negative numbers do not have any compositions, but 0 has one composition, the empty sequence. Each positive integer n has 2n−1 distinct compositions.A weak composition of an integer n is similar to a composition of n, but allowing terms of the sequence to be zero: it is a way of writing n as the sum of a sequence of non-negative integers. As a consequence every positive integer admits infinitely many weak compositions (if their length is not bounded). Adding a number of terms 0 to the end of a weak composition is usually not considered to define a different weak composition; in other words, weak compositions are assumed to be implicitly extended indefinitely by terms 0.To further generalize, an A-restricted composition of an integer n, for a subset A of the (nonnegative or positive) integers, is an ordered collection of one or more elements in A whose sum is n.".
- Composition_(combinatorics) thumbnail Binary_and_compositions_4.svg?width=300.
- Composition_(combinatorics) wikiPageExternalLink partitions.htm.
- Composition_(combinatorics) wikiPageID "550741".
- Composition_(combinatorics) wikiPageLength "5315".
- Composition_(combinatorics) wikiPageOutDegree "13".
- Composition_(combinatorics) wikiPageRevisionID "648373224".
- Composition_(combinatorics) wikiPageWikiLink Binomial_coefficient.
- Composition_(combinatorics) wikiPageWikiLink Category:Combinatorics.
- Composition_(combinatorics) wikiPageWikiLink Category:Number_theory.
- Composition_(combinatorics) wikiPageWikiLink Integer.
- Composition_(combinatorics) wikiPageWikiLink Mathematics.
- Composition_(combinatorics) wikiPageWikiLink Natural_number.
- Composition_(combinatorics) wikiPageWikiLink Non-negative_integer.
- Composition_(combinatorics) wikiPageWikiLink Partition_(number_theory).
- Composition_(combinatorics) wikiPageWikiLink Positive_integer.
- Composition_(combinatorics) wikiPageWikiLink Stars_and_bars_(combinatorics).
- Composition_(combinatorics) wikiPageWikiLink Summation.
- Composition_(combinatorics) wikiPageWikiLink File:Binary_and_compositions_4.svg.
- Composition_(combinatorics) wikiPageWikiLink File:Compositions_of_6.svg.
- Composition_(combinatorics) wikiPageWikiLink File:Partitions_of_6.svg.
- Composition_(combinatorics) wikiPageWikiLinkText "Composition (combinatorics)".
- Composition_(combinatorics) wikiPageWikiLinkText "composition".
- Composition_(combinatorics) wikiPageWikiLinkText "compositions".
- Composition_(combinatorics) hasPhotoCollection Composition_(combinatorics).
- Composition_(combinatorics) wikiPageUsesTemplate Template:Cite_book.
- Composition_(combinatorics) wikiPageUsesTemplate Template:Other_uses_of.
- Composition_(combinatorics) wikiPageUsesTemplate Template:Reflist.
- Composition_(combinatorics) subject Category:Combinatorics.
- Composition_(combinatorics) subject Category:Number_theory.
- Composition_(combinatorics) hypernym Way.
- Composition_(combinatorics) comment "In mathematics, a composition of an integer n is a way of writing n as the sum of a sequence of (strictly) positive integers. Two sequences that differ in the order of their terms define different compositions of their sum, while they are considered to define the same partition of that number. Every integer has finitely many distinct compositions. Negative numbers do not have any compositions, but 0 has one composition, the empty sequence.".
- Composition_(combinatorics) label "Composition (combinatorics)".
- Composition_(combinatorics) sameAs Composition_(combinatoire).
- Composition_(combinatorics) sameAs m.02p3kj.
- Composition_(combinatorics) sameAs Композиция_числа.
- Composition_(combinatorics) sameAs Kompozicioni_i_numrit_natyral.
- Composition_(combinatorics) sameAs Q3302331.
- Composition_(combinatorics) sameAs Q3302331.
- Composition_(combinatorics) wasDerivedFrom Composition_(combinatorics)?oldid=648373224.
- Composition_(combinatorics) depiction Binary_and_compositions_4.svg.
- Composition_(combinatorics) isPrimaryTopicOf Composition_(combinatorics).