Diameter (group theory)

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In the area of abstract algebra known as group theory, the diameter of a finite group is a measure of its complexity.

Consider a finite group $(G, \circ)$ , and any set of generators Template:Mvar. Define $D_{S}$ to be the graph diameter of the Cayley graph $Λ = (G, S)$ . Then the diameter of $(G, \circ)$ is the largest value of $D_{S}$ taken over all generating sets Template:Mvar.

For instance, every finite cyclic group of order Template:Mvar, the Cayley graph for a generating set with one generator is an Template:Mvar-vertex cycle graph. The diameter of this graph, and of the group, is $⌊ s / 2 ⌋$ .^[1]

It is conjectured, for all non-abelian finite simple groups Template:Mvar, that^[2]

diam (G) ⩽ {(\log | G |)}^{𝒪 (1)} .

Many partial results are known but the full conjecture remains open.^[3]

References

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↑ Template:Harvtxt, Conj. 1.7. This conjecture is misquoted by Template:Harvtxt, who omit the non-abelian qualifier.
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[1] Template:Citation.

[2] Template:Harvtxt, Conj. 1.7. This conjecture is misquoted by Template:Harvtxt, who omit the non-abelian qualifier.

[3] Template:Citation.

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Diameter (group theory)

References

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