Reachability Matrix: Difference between revisions

Reachability Matrix (view source)

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-In graph theory, reachability refers to the ability to get from one vertex to another within a graph. A vertex
+In graph theory, '''''reachability''''' refers to the ability to get from one [[Vertex|vertex]] to another within a graph.
-s
-s can reach a vertex
-t
-t (and
-t
-t is reachable from
-s
-s) if there exists a sequence of adjacent vertices (i.e. a walk) which starts with
-s
-s and ends with
-t
-t.
-Usually there are several adjacency matrices that have the same reachability matrix. However, in forming a digraph from a Reachability Matrix, a valuable digraph uniqueness can be achieved by applying the criterion that the digraph have the minimum possible number of edges that maintains reachability,represented by entries of 1 in the reachability matrix.
+A vertex ''s'' can reach a vertex ''t'' (and ''t'' is reachable from ''s'') if there exists a sequence of adjacent vertices (i.e. a walk) which starts with ''s'' and ends with ''t''.
+The '''Reachability Matrix''' can be derived from the [[Adjacency Matrix]] if the relation modeled is [[transitive]] and [[multilevel]].
+Usually, there are several Adjacency matrices that have the same Reachability Matrix. However, in forming a digraph from a Reachability Matrix, a valuable digraph uniqueness can be achieved by applying the criterion that the digraph have the minimum possible number of edges that maintains reachability,represented by entries of 1 in the Reachability Matrix.