Book contents
- Frontmatter
- Contents
- Foreword
- Participants
- On bounded languages and the geometry of nilpotent groups
- Finitely presented groups and the finite generation of exterior powers
- Semigroup presentations and minimal ideals
- Generalised trees and Λ-trees
- The mathematician who had little wisdom: a story and some mathematics
- Palindromic automorphisms of free groups
- A Freiheitssatz for certain one-relator amalgamated products
- Isoperimetric functions of groups and exotic cohomology
- Some embedding theorems and undecidability questions for groups
- Some results on bounded cohomology
- On perfect subgroups of one-relator groups
- Weight tests and hyperbolic groups
- A non-residually finite, relatively finitely presented group in the variety N2A
- Hierarchical decompositions, generalized Tate cohomology, and groups of type (FP)∞
- Tree-lattices and lattices in Lie groups
- Generalisations of Fibonacci numbers, groups and manifolds
- Knotted surfaces in the 4-sphere with no minimal Seifert manifolds
- The higher geometric invariants of modules over Noetherian group rings
- On calculation of width in free groups
- Hilbert modular groups and isoperimetric inequalities
- On systems of equations in free groups
- Cogrowth and essentiality in groups and algebras
- Regular geodesic languages for 2-step nilpotent groups
- Finding indivisible Nielsen paths for a train track map
- More on Burnside's problem
- Problem Session
Finding indivisible Nielsen paths for a train track map
Published online by Cambridge University Press: 05 April 2013
- Frontmatter
- Contents
- Foreword
- Participants
- On bounded languages and the geometry of nilpotent groups
- Finitely presented groups and the finite generation of exterior powers
- Semigroup presentations and minimal ideals
- Generalised trees and Λ-trees
- The mathematician who had little wisdom: a story and some mathematics
- Palindromic automorphisms of free groups
- A Freiheitssatz for certain one-relator amalgamated products
- Isoperimetric functions of groups and exotic cohomology
- Some embedding theorems and undecidability questions for groups
- Some results on bounded cohomology
- On perfect subgroups of one-relator groups
- Weight tests and hyperbolic groups
- A non-residually finite, relatively finitely presented group in the variety N2A
- Hierarchical decompositions, generalized Tate cohomology, and groups of type (FP)∞
- Tree-lattices and lattices in Lie groups
- Generalisations of Fibonacci numbers, groups and manifolds
- Knotted surfaces in the 4-sphere with no minimal Seifert manifolds
- The higher geometric invariants of modules over Noetherian group rings
- On calculation of width in free groups
- Hilbert modular groups and isoperimetric inequalities
- On systems of equations in free groups
- Cogrowth and essentiality in groups and algebras
- Regular geodesic languages for 2-step nilpotent groups
- Finding indivisible Nielsen paths for a train track map
- More on Burnside's problem
- Problem Session
Summary
Abstract
An algorithm is described for determining the indivisible Nielsen paths for a train track map and therefore the subgroup of elements of the fundamental group fixed by the induced automorphism.
In my talk at the Edinburgh Conference I described the “procedure” for finding fixed points of an automorphism of a free group that is implicit in [6] and explicit in [2] and [7]. I made the point that this is a procedure and not an algorithm since there is no way in general of knowing how long to persist before being sure that all fixed elements have been found—although it has been shown to be effective for positive automorphisms [2]. The example of Stallings [8], p99, figure 3 (Example 1 below) was presented to show that one may need more persistence than expected. I also discussed the notion of an indivisible Nielsen path (INP) which was introduced in [1] and used as a fundamental tool in [4]. After the talk, Bestvina asked me whether the procedure could be adapted to determine the INPs for a train track map, the determination of which is an essential part of the algorithm introduced in [1] for finding the fixed words of the induced automorphism. This paper shows how to do this. All irreducible automorphisms have train track representatives so this provides a straightforward means (given the train track map!) of computing the generator of the fixed subgroup.
- Type
- Chapter
- Information
- Combinatorial and Geometric Group Theory, Edinburgh 1993 , pp. 300 - 313Publisher: Cambridge University PressPrint publication year: 1994
- 4
- Cited by