Matroid: Difference between revisions

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In [[mathematics]], a '''matroid''' or '''independence space''' is a structure that generalises the concept of [[linear independence|linear]] and [[algebraic independence]].
In [[mathematics]], a '''matroid''' or '''independence space''' is a structure that generalises the concept of [[linear independence|linear]] and [[algebraic independence]].


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==References==
==References==
* {{cite book | author=Victor Bryant | coauthors=Hazel Perfect | title=Independence Theory in Combinatorics | publisher=Chapman and Hall | year=1980 | isbn=0-412-22430-5 }}
* {{cite book | author=Victor Bryant | coauthors=Hazel Perfect | title=Independence Theory in Combinatorics | publisher=Chapman and Hall | year=1980 | isbn=0-412-22430-5 }}
* {{cite book | author=James Oxley | title=Matroid theory | publisher=[[Oxford University Press]] | year=1992 | isbn =0-19-853563-5 }}
* {{cite book | author=James Oxley | title=Matroid theory | publisher=[[Oxford University Press]] | year=1992 | isbn =0-19-853563-5 }}[[Category:Suggestion Bot Tag]]

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In mathematics, a matroid or independence space is a structure that generalises the concept of linear and algebraic independence.

An independence structure on a ground set E is a family of subsets of E, called independent sets, with the properties

  • is a downset, that is, ;
  • The exchange property: if with then there exists such that .

A basis in an independence structure is a maximal independent set. Any two bases have the same number of elements. A circuit is a minimal dependent set. Independence spaces can be defined in terms of their systems of bases or of their circuits.

Examples

The following sets form independence structures:

Rank

We define the rank ρ(A) of a subset A of E to be the maximum cardinality of an independent subset of A. The rank satisfies the following

The last of these is the submodular inequality.

A flat is a subset A of E such that the rank of A is strictly less than the rank of any proper superset of A.

References