English

Automorphisms of one-relator groups

Group Theory 2009-10-31 v1

Abstract

It is a well-known fact that every group GG has a presentation of the form G=F/RG = F/R, where FF is a free group and RR the kernel of the natural epimorphism from FF onto GG. Driven by the desire to obtain a similar presentation of the group of automorphisms Aut(G)Aut(G), we can consider the subgroup Stab(R)Aut(F)Stab(R) \subseteq Aut(F) of those automorphisms of FF that stabilize RR, and try to figure out if the natural homomorphism Stab(R)Aut(G)Stab(R) \to Aut(G) is onto, and if it is, to determine its kernel. Both parts of this task are usually quite hard. The former part received considerable attention in the past, whereas the latter, more difficult, part (determining the kernel) seemed unapproachable. Here we approach this problem for a class of one-relator groups with a special kind of small cancellation condition. Then, we address a somewhat easier case of 2-generator (not necessarily one-relator) groups, and determine the kernel of the above mentioned homomorphism for a rather general class of those groups.

Keywords

Cite

@article{arxiv.math/9802094,
  title  = {Automorphisms of one-relator groups},
  author = {Vladimir Shpilrain},
  journal= {arXiv preprint arXiv:math/9802094},
  year   = {2009}
}

Comments

LaTex file, 8 pages