Schreier coset graph: Difference between revisions

In the area of mathematics called combinatorial group theory, the Schreier coset graph is a graph associated to a group G, a generating set { x_i : i in I }, and a subgroup H ≤ G.

Description

The vertices of the graph are the right cosets Hg = { hg : h in H } for g in G.

The edges of the graph are of the form (Hg,Hgx_i).

The Cayley graph of the group G with { x_i : i in I } is the Schreier coset graph for H = { 1_G },(Gross & Tucker 1987, p. 73).

A spanning tree of a Schreier coset graph corresponds to a Schreier transversal, as in Schreier's subgroup lemma, (Conder 2003).

Name

The graph is named after Otto Schreier.

Applications

The graph is useful to understand coset enumeration and the Todd–Coxeter algorithm.

Coset graphs can be used to form large permutation representations of groups and were used by Graham Higman to show that the alternating groups of large enough degree are Hurwitz groups, (Conder 2003).

Every vertex-transitive graph is a coset graph.

References

• Conder, Marston (2003), "Group actions on graphs, maps and surfaces with maximum symmetry", Groups St. Andrews 2001 in Oxford. Vol. I, London Math. Soc. Lecture Note Ser., vol. 304, Cambridge University Press, pp. 63–91, MR2051519
• Gross, Jonathan L.; Tucker, Thomas W. (1987), Topological graph theory, Wiley-Interscience Series in Discrete Mathematics and Optimization, New York: John Wiley & Sons, ISBN 978-0-471-04926-5, MR898434
• Schreier graphs of the Basilica group Authors: Daniele D'Angeli, Alfredo Donno, Michel Matter, Tatiana Nagnibeda