Baumslag–Solitar group

In the mathematical field of group theory, the Baumslag–Solitar groups are examples of two-generator one-relator groups that play an important role in combinatorial group theory and geometric group theory as (counter)examples and test-cases. They are given by the group presentation

For each integer $m$ and $n$ , the Baumslag–Solitar group is denoted $BS(m, n)$ . The relation in the presentation is called the Baumslag–Solitar relation.

Some of the various $BS(m, n)$ are well-known groups. $BS(1, 1)$ is the free abelian group on two generators, and $BS(1, -1)$ is the fundamental group of the Klein bottle.

The groups were defined by Gilbert Baumslag and Donald Solitar in 1962 to provide examples of non-Hopfian groups. The groups contain residually finite groups, Hopfian groups that are not residually finite, and non-Hopfian groups.

Define

The matrix group $G$ generated by $A$ and $B$ is a homomorphic image of $BS(m, n)$ , via the homomorphism induced by

It is worth noting that this will not, in general, be an isomorphism. For instance if $BS(m, n)$ is not residually finite (i.e. if it is not the case that $| m | = 1$ , $| n | = 1$ , or $| m | = | n |$ ) it cannot be isomorphic to a finitely generated linear group, which is known to be residually finite by a theorem of Mal'cev.

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