Baumslag–Gersten group explained

In the mathematical subject of geometric group theory, the Baumslag–Gersten group, also known as the Baumslag group, is a particular one-relator group exhibiting some remarkable properties regarding its finite quotient groups, its Dehn function and the complexity of its word problem.

The group is given by the presentation

G=\langlea,t\mid

at
a

=a2\rangle=\langlea,t\mid(t-1a-1t)a(t-1at)=a2\rangle

Here exponential notation for group elements denotes conjugation, that is,

gh=h-1gh

for

g,h\inG

.

History

The Baumslag–Gersten group G was originally introduced in a 1969 paper of Gilbert Baumslag,[1] as an example of a non-residually finite one-relator group with an additional remarkable property that all finite quotient groups of this group are cyclic. Later, in 1992, Stephen Gersten showed that G, despite being a one-relator group given by a rather simple presentation, has the Dehn function growing very quickly, namely faster than any fixed iterate of the exponential function. This example remains the fastest known growth of the Dehn function among one-relator groups. In 2011 Alexei Myasnikov, Alexander Ushakov, and Dong Wook Won[2] proved that G has the word problem solvable in polynomial time.

Baumslag-Gersten group as an HNN extension

BS(1,2)=\langlea,b\midab=a2\rangle

with stable letter t and two cyclic associated subgroups

\langlea\rangle,\langleb\rangle

:

G=\langlea,t\mid

at
a

=a2\rangle=\langlea,b,t\midab=a2,at=b\rangle.

Properties of the Baumslag–Gersten group G

Z\left[1
2
\right]
and in particular is not finitely generated.[3]

\exp\circlog(1)=(\exp\underbrace{\circ\circ}log\exp)(1)

Generalizations

\langlea,t\mid(ap)

(t-1akt)

=am\rangle,

where

p,k,m\ne0

and generalized many of Baumslag's original results in that context.

See also

External links

Notes and References

  1. Gilbert . Baumslag. Gilbert Baumslag. A non-cyclic one-relator group all of whose finite factor groups are cyclic. . 10. 1969. 497–498. 0254127 . 10.1017/S1446788700007783. free.
  2. Alexei. Myasnikov. Alexander. Ushakov. Dong Wook. Won. The word problem in the Baumslag group with a non-elementary Dehn function is polynomial time decidable. . 345. 2011. 324–342. 10.1016/j.jalgebra.2011.07.024. 1102.2481. 2842068.
  3. Brunner. Andrew. 1980. On a class of one-relator groups. . 571934. 32. 2. 414–420. 10.4153/CJM-1980-032-8. free.
  4. A.N. . Platonov . An isoparametric function of the Baumslag–Gersten group . Moscow Univ. Math. Bull. . 59 . 3 . 12–17 . 2004 . 2127449 .
  5. Beese . Janis . 2012 . Das Konjugations problem in der Baumslag–Gersten–Gruppe . Diploma . Fakultät Mathematik, Universität Stuttgart .
  6. Volker . Diekert . Alexei G. . Myasnikov . Armin . Weiß . Conjugacy in Baumslag's group, generic case complexity, and division in power circuits . Algorithmica . 76 . 4 . 961–988 . 2016 . 10.1007/s00453-016-0117-z . 3567623. 1309.5314 .
  7. Mahan Mitra . Mahan . Mitra . Coarse extrinsic geometry: a survey . Geom. Topol. Monogr. . 1 . 341–364 . 1998 . 10.2140/gtm.1998.1.341 . 1668308 . math.DG/9810203. Geometry & Topology Monographs .