- Shrikhande graph
infobox graph
name = Shrikhande graph
image_caption = The Shrikhande graph drawn symmetrically.
namesake =S. S. Shrikhande
vertices = 16
edges = 48
chromatic_number =
chromatic_index =
properties = Strongly regularThe Shrikhande graph is a named graph in
graph theory , discovered byS. S. Shrikhande in 1959. It is astrongly regular graph with 16 vertices and 48 edges, with each vertex having a degree of 6. It has the property that any two vertices I and J have two distinct neighbors in common (excluding the two vertices I and J themselves), which holds true whether or not I is adjacent to J. In other words, its parameters for being strongly regular are: {16,6,2,2}, with , this equality implying that the graph is associated with a symmetricBIBD .The Shrikhande graph is locally hexagonal; that is, the neighbors of each vertex form a cycle of six vertices. As with any locally cyclic graph, the Shrikhande graph is the 1-skeleton of a Whitney triangulation of some surface; in the case of the Shrikhande graph, this surface is a
torus in which each vertex is surrounded by six triangles. Thus, the Shrikhande graph is atoroidal graph .External links
*mathworld|urlname=ShrikhandeGraph|title=Shrikhande Graph
* [http://www.win.tue.nl/~aeb/drg/graphs/Shrikhande.html Shrikhande graph embedded in a torus]References
* D.A. Holton and J. Sheehan, "The Petersen graph",
Cambridge University Press , 1993, ISBN 0-521-43594-3. Page 270.
* S.S. Shrikhande, "The uniqueness of the L2 association scheme", "Ann .Math. Statist." 30 (1959) 781-798.
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