In the mathematical discipline of graph theory, the (m,n)-lollipop graph is a special type of graph consisting of a complete graph (clique) on m vertices and a path graph on n vertices, connected with a bridge. [1]
The special case of the (2n/3,n/3)-lollipop graphs are known as graphs which achieve the maximum possible hitting time,[2] cover time[3] and commute time.[4]
^Brightwell, Graham; Winkler, Peter (September 1990). "Maximum hitting time for random walks on graphs". Random Structures & Algorithms. 1 (3): 263–276. doi:10.1002/rsa.3240010303.
^Feige, Uriel (August 1995). "A tight upper bound on the cover time for random walks on graphs". Random Structures & Algorithms. 6: 51–54. CiteSeerX10.1.1.38.1188. doi:10.1002/rsa.3240060106.
^Jonasson, Johan (March 2000). "Lollipop graphs are extremal for commute times". Random Structures and Algorithms. 16 (2): 131–142. doi:10.1002/(SICI)1098-2418(200003)16:2<131::AID-RSA1>3.0.CO;2-3.
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lollipop, graph, mathematical, discipline, graph, theory, lollipop, graph, special, type, graph, consisting, complete, graph, clique, vertices, path, graph, vertices, connected, with, bridge, lollipop, graphverticesm, displaystyle, edges, displaystyle, tbinom,. In the mathematical discipline of graph theory the m n lollipop graph is a special type of graph consisting of a complete graph clique on m vertices and a path graph on n vertices connected with a bridge 1 Lollipop graphA 8 4 lollipop graphVerticesm n displaystyle m n Edges m2 n displaystyle tbinom m 2 n Girth m 23otherwise displaystyle left begin array ll infty amp m leq 2 3 amp text otherwise end array right PropertiesconnectedNotationLm n displaystyle L m n Table of graphs and parametersThe special case of the 2n 3 n 3 lollipop graphs are known as graphs which achieve the maximum possible hitting time 2 cover time 3 and commute time 4 See also editBarbell graph Tadpole graphReferences edit Weisstein Eric Lollipop Graph Wolfram Mathworld Wolfram MathWorld Retrieved 19 August 2015 Brightwell Graham Winkler Peter September 1990 Maximum hitting time for random walks on graphs Random Structures amp Algorithms 1 3 263 276 doi 10 1002 rsa 3240010303 Feige Uriel August 1995 A tight upper bound on the cover time for random walks on graphs Random Structures amp Algorithms 6 51 54 CiteSeerX 10 1 1 38 1188 doi 10 1002 rsa 3240060106 Jonasson Johan March 2000 Lollipop graphs are extremal for commute times Random Structures and Algorithms 16 2 131 142 doi 10 1002 SICI 1098 2418 200003 16 2 lt 131 AID RSA1 gt 3 0 CO 2 3 nbsp This graph theory related article is a stub You can help Wikipedia by expanding it vte Retrieved from https en wikipedia org w index php title Lollipop graph amp oldid 1169852754, wikipedia, wiki, book, books, library,
