Higman group

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Template:For In mathematics, the Higman group, introduced by Template:Harvs, was the first example of an infinite finitely presented group with no nontrivial finite quotients. The quotient by the maximal proper normal subgroup is a finitely generated infinite simple group. Template:Harvtxt later found some finitely presented infinite groups Template:Math that are simple if Template:Math is even and have a simple subgroup of index 2 if Template:Math is odd, one of which is one of the Thompson groups.

Higman's group is generated by 4 elements Template:Math with the relations

a^{- 1} b a = b^{2}, b^{- 1} c b = c^{2}, c^{- 1} d c = d^{2}, d^{- 1} a d = a^{2} .

References

Template:Group-theory-stub

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Group theory