Higman–Sims graph: Difference between revisions

Higman–Sims graph
File:Higman sims garph.gif The graph with semi-random vertex position.
Named after	Donald G. Higman Charles C. Sims
Vertices	100
Properties	Strongly regular
Table of graphs and parameters

In mathematics, the Higman–Sims graph is the unique strongly regular graph with 100 vertices and valency 22, where no neighboring pair of vertices share a common neighbor and each non-neighboring pair of vertices share six common neighbors. It was constructed by Donald G. Higman and Charles C. Sims as a way to define the Higman–Sims group, and that group is a subgroup of index two in the group of automorphisms of the Higman–Sims graph.

Construction begins with the M₂₂ graph, whose 77 vertices are the blocks of the S(3,6,22) Steiner system W₂₂. Adjacent vertices are defined to be disjoint blocks. This graph is strongly regular; any vertex has 16 neighbors, any 2 adjacent vertices have no common neighbors, and any 2 non-adjacent vertices have 4 common neighbors. This graph has M₂₂:2 as its automorphism group, M₂₂ being a Mathieu group.

The Higman–Sims graph is then formed by appending the 22 points of W₂₂ and a 100th vertex C. The neighbors of C are defined to be those 22 points. A point adjacent to a block is defined to be one that is included.

A Higman–Sims graph can be partitioned into 2 copies of the Hoffman-Singleton graph and there are 352 ways to do this.

In the depiction at the right, the 77 black vertices are the blocks of Steiner System, the 22 blue vertices are W₂₂ and the red one is the 100th vertex. The 616 black edges connects the disjoint blocks, the 462 blue edges connects the blocks with the W₂₂ nodes and the 22 red edges forms the central wheel. In total, this graph has 1100 edges.

References

• Higman, D. G.; Sims, C. (1968). "A simple group of order 44,352,000". Math.Z. 105: 110–113. doi:10.1007/BF01110435.

External links

• Brouwer, Andries E. "Higman-Sims graph".

• Weisstein, Eric W. "Higman-Sims Graph". MathWorld.