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Undergraduate
By
Shiva Kintali
on July 30, 2012 | Updated Dec. 6, 2017
k-regular bipartite graphs are 2-connected
Prove that every connected \(k\)-regular bipartite graph on at least three vertices is 2-connected.
Mathematics
Graph Theory
bipartite graph
connectivity
0
Graduate
By
Shiva Kintali
on June 6, 2012 | Updated Dec. 6, 2017
Minimum Flip Connectivity Problem
Let \(G(V,E)\) be a directed graph such that if \(e=(u,v) \in E\) then \((v,u) \notin E\), i.e., \(G\) is an orientation of the underlying undirected graph. Consider the following operations : …
Computer Science
Mathematics
Algorithms
Graph Theory
connectivity
0
Undergraduate
By
Shiva Kintali
on Oct. 3, 2013 | Updated Jan. 4, 2018
Regular planar graphs
Prove or disprove : For each \(n\in \mathbb{N}\), there is a simple connected \(4\)-regular planar graph with more than \(n\) vertices. Prove that a planar, simple, connected, \(6\)-regular graph…
Mathematics
Graph Theory
connectivity
planar graphs
regular graphs
0
Graduate
By
Shiva Kintali
on Dec. 3, 2012 | Updated Dec. 6, 2017
2-connectivity and bipartite minors
Prove that for every integer \(t\) there exists an integer \(n\) such that every 2-connected graph on at least \(n\) vertices has either a cycle of length at least \(t\) or a \(K_{2,t}\) minor.
Mathematics
Graph Theory
connectivity
graph minors
0
Undergraduate
By
Shiva Kintali
on June 5, 2012 | Updated Dec. 6, 2017
Properties of Petersen Graph
Petersen Graph is the graph shown below : Prove the following properties of the Petersen Graph : It is not planar. It is strongly-regular. It has a Hamiltonian path but no Hamiltonian Cycle. It i…
Mathematics
Graph Theory
connectivity
hamiltonian cycle
matching
petersen graph
0
Graduate
By
Shiva Kintali
on July 28, 2012 | Updated Dec. 6, 2017
Petersen’s theorem
Prove that every 2-edge-connected 3-regular graph has a perfect matching
Mathematics
Graph Theory
connectivity
matching
0
Graduate
By
Shiva Kintali
on Aug. 8, 2012 | Updated Dec. 6, 2017
Halin's theorem and Mader's theorem
Prove the following : Halin's Theorem : (Easy) There is a node of degree \(k\) in any edge-minimal \(k\)-vertex-connected graph. Mader's Theorem : (Hard) In any edge-minimal \(k\)-vertex-connected …
Mathematics
Graph Theory
connectivity
0
Undergraduate
By
Shiva Kintali
on May 19, 2013 | Updated Dec. 6, 2017
Basics of Connectivity
Prove that a connected graph \(G\) with \(2k\) odd vertices (odd degree vertices) decomposes into \(k\) paths (not necessarily simple paths) if \(k > 0\). Does this remain true if \(G\) is not connec…
Mathematics
Graph Theory
basics
connectivity
0
Undergraduate
By
Shiva Kintali
on June 17, 2012 | Updated Dec. 6, 2017
Edge connectivity vs Strong connectivity
A directed graph \(D\) is strongly connected if and only if \(\forall\) \(u,v\) there exists a directed path from \(u\) to \(v\). Prove that for an undirected graph \(G\) the following two are equival…
Mathematics
Graph Theory
connectivity
0
Undergraduate
By
Shiva Kintali
on June 14, 2012 | Updated Dec. 6, 2017
Connectivity of cubic graphs
Prove that if \(G\) is 3-regular graph, then its vertex-connectivity equals its edge-connectivity.
Mathematics
Graph Theory
connectivity
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