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Arborescence: различия между версиями
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'''Arborescence''' | '''Arborescence''' — ''[[ориентированное дерево]].'' | ||
This is a digraph <math>G</math> with | This is a [[digraph]] <math>\,G</math> with a specified [[vertex]] <math>\,a</math> called a ''[[root]]'' such that each ''[[point]]'' <math>x\neq a</math> has [[indegree]] 1 and there is a unique <math>\,(a,x)</math>-path for each point <math>\,x</math>. | ||
a specified vertex <math>a</math> called a ''root'' such that each ''point'' <math>x | '''Arborescence''' can be obtained by specifying a [[vertex]] <math>\,a</math> of a [[tree]] | ||
\neq a</math> has indegree 1 and there is a unique <math>(a,x)</math>-path for each point <math>x</math>. | and then orienting each [[edge]] <math>\,e</math> such that the unique [[path]] connecting | ||
'''Arborescence''' can be obtained by specifying a vertex <math>a</math> of a tree | <math>\,a</math> to <math>\,e</math> ends at the tail of <math>\,e</math>. An '''[[inverse arborescence]]''' is a digraph obtained from an '''arborescence''' by inverting its edges. | ||
and then orienting each edge <math>e</math> such that the unique path connecting | |||
<math>a</math> to <math>e</math> ends at the tail of <math>e</math>. An '''inverse arborescence''' is a digraph | |||
obtained from an '''arborescence''' by inverting its edges. | |||
