Connected component of a hypergraph: различия между версиями

Материал из WEGA
Перейти к навигации Перейти к поиску
(Новая страница: «'''Connected component of a hypergraph''' --- связная компонента гиперграфа. Let <math>{\mathcal E} = (V, \{E_{1}, \ldots, E_{m}\})</mat…»)
 
Нет описания правки
 
Строка 1: Строка 1:
'''Connected component of a hypergraph''' --- связная компонента
'''Connected component of a hypergraph''' — ''[[связная компонента гиперграфа]].''
гиперграфа.  


Let <math>{\mathcal E} = (V, \{E_{1}, \ldots, E_{m}\})</math> be a hypergraph. A
Let <math>\mathcal {E} = (V, \{E_{1}, \ldots, E_{m}\})</math> be a [[hypergraph]]. A sequence <math>(E_{1}, \ldots, E_{k})</math> of distinct hyperedges is a '''[[path]]''' of length <math>\,k</math> if for all <math>\,i, \; 1 \leq i < m, \; E_{i} \cap E_{i+1} \neq \emptyset</math>. Two [[vertex|vertices]] <math>\,x \in E_{1}, \; y \in E_{k}</math> are connected (by the path <math>(E_{1}, \ldots, E_{k})</math>), and <math>\,E_{1}</math> and <math>\,E_{k}</math> are also connected. A set of hyperedges is '''connected''' if every pair of hyperedges in the set is connected. A '''connected component of a hypergraph''' is a maximal connected set of hyperedges.
sequence <math>(E_{1}, \ldots, E_{k})</math> of distinct hyperedges is a '''path''' of length <math>k</math> if for all <math>i, \; 1 \leq i < m, \; E_{i} \cap
 
E_{i+1} \neq \emptyset</math>. Two vertices <math>x \in E_{1}, \; y \in E_{k}</math>
==Литература==
are connected (by the path <math>(E_{1}, \ldots, E_{k})</math>), and <math>E_{1}</math>
 
and <math>E_{k}</math> are also connected. A set of hyperedges is ''' connected''' if
* Евстигнеев В.А., Касьянов В.Н. Словарь по графам в информатике. — Новосибирск: Сибирское Научное Издательство, 2009.
every pair of hyperedges in the set is connected. A '''connected component of a hypergraph''' is a
maximal connected set of hyperedges.

Текущая версия от 10:48, 24 октября 2018

Connected component of a hypergraphсвязная компонента гиперграфа.

Let [math]\displaystyle{ \mathcal {E} = (V, \{E_{1}, \ldots, E_{m}\}) }[/math] be a hypergraph. A sequence [math]\displaystyle{ (E_{1}, \ldots, E_{k}) }[/math] of distinct hyperedges is a path of length [math]\displaystyle{ \,k }[/math] if for all [math]\displaystyle{ \,i, \; 1 \leq i \lt m, \; E_{i} \cap E_{i+1} \neq \emptyset }[/math]. Two vertices [math]\displaystyle{ \,x \in E_{1}, \; y \in E_{k} }[/math] are connected (by the path [math]\displaystyle{ (E_{1}, \ldots, E_{k}) }[/math]), and [math]\displaystyle{ \,E_{1} }[/math] and [math]\displaystyle{ \,E_{k} }[/math] are also connected. A set of hyperedges is connected if every pair of hyperedges in the set is connected. A connected component of a hypergraph is a maximal connected set of hyperedges.

Литература

  • Евстигнеев В.А., Касьянов В.Н. Словарь по графам в информатике. — Новосибирск: Сибирское Научное Издательство, 2009.