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IPL
2008

The hub number of a graph

13 years 11 months ago
The hub number of a graph
A hub set in a graph G is a set U V (G) such that any two vertices outside U are connected by a path whose internal vertices lie in U. We prove that h(G) hc(G) c(G) h(G) + 1, where h(G), hc(G), and c(G), respectively, are the minimum sizes of a hub set in G, a hub set inducing a connected subgraph, and a connected dominating set. Furthermore, all graphs with c(G) > hc(G) 4 are obtained by substituting graphs into three consecutive vertices of a cycle; this yields a polynomial-time algorithm to check whether hc(G) = c(G).
Tracy Grauman, Stephen G. Hartke, Adam Jobson, Bil
Added 12 Dec 2010
Updated 12 Dec 2010
Type Journal
Year 2008
Where IPL
Authors Tracy Grauman, Stephen G. Hartke, Adam Jobson, Bill Kinnersley, Douglas B. West, Lesley Wiglesworth, Pratik Worah, Hehui Wu
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