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'''Cycle matroid''' | '''Cycle matroid''' — ''[[матроид циклов]].'' | ||
Let <math>E(G)</math> be the edge-set of a graph <math>G</math> and <math>C</math> be the set of | Let <math>\,E(G)</math> be the [[edge]]-set of a [[graph, undirected graph, nonoriented graph|graph]] <math>\,G</math> and <math>\,C</math> be the set of [[cycle|cycles]]. The cycles satisfy the circuit postulates. Thus, we obtain a ''[[matroid]]'' related to the graph. We denote this matroid by <math>\,M(G)</math> and call it the '''cycle matroid''' of <math>\,G</math>. The bases of <math>\,M(G)</math> are the ''[[spanning tree|spanning trees]]''. | ||
cycles. The cycles satisfy the circuit postulates. Thus, we obtain a | |||
''matroid'' related to the graph. We denote this matroid by <math>M(G)</math> | |||
and call it the '''cycle matroid''' of <math>G</math>. The bases of <math>M(G)</math> are | |||
the ''spanning trees''. | |||
The ''rank'' of <math>M(G)</math> is less by 1 than the | The ''[[rank of a matroid|rank]]'' of <math>\,M(G)</math> is less by <math>\,1</math> than the number of [[vertex|vertices]]. | ||
number of vertices. | |||
==Литература== | |||
* Евстигнеев В.А., Касьянов В.Н. Словарь по графам в информатике. — Новосибирск: Сибирское Научное Издательство, 2009. |