dominating_set(G, start_with=None)
A dominating set for a graph with node set V is a subset D of V such that every node not in D is adjacent to at least one member of D .
This function is an implementation of algorithm 7 in which finds some dominating set, not necessarily the smallest one.
Node to use as a starting point for the algorithm.
A dominating set for G.
Finds a dominating set for the graph G.
The following pages refer to to this document either explicitly or contain code examples using this.
networkx.algorithms.dominating.is_dominating_set
Hover to see nodes names; edges to Self not shown, Caped at 50 nodes.
Using a canvas is more power efficient and can get hundred of nodes ; but does not allow hyperlinks; , arrows or text (beyond on hover)
SVG is more flexible but power hungry; and does not scale well to 50 + nodes.
All aboves nodes referred to, (or are referred from) current nodes; Edges from Self to other have been omitted (or all nodes would be connected to the central node "self" which is not useful). Nodes are colored by the library they belong to, and scaled with the number of references pointing them