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
Some embedding theorems and undecidability questions for groups
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
AUTHOR'S NOTE. This paper was written in 1980, but was not published at that time. The reference made to it in Miller's survey article [10], however, made me think that it might be worth publishing. It is unchanged except for the deletion of some remarks that either are outdated or no longer seem interesting. I am grateful to Professor Miller for his interest in the paper.
Introduction.
In the first part of this paper we give proofs of two embedding theorems for groups, and a version of the Adjan-Rabin construction for showing that many group-theoretic decision problems are unsolvable, which seem to be simpler than the standard ones. In the second part we consider some specific undecidability questions.
In [5], Higman, Neumann and Neumann proved the following theorem (see also [11]).
Theorem 1 Every countable group G can be embedded in a 2-generator group H. If G is n-relator, then H may be taken to be n-relator.
P. Hall (unpublished) proved that every countable group can be embedded in a finitely generated simple group. This was sharpened by Goryushkin [3] and Schupp [13] to
Theorem 2 Every countable group can be embedded in a 2-generator simple group.
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- Information
- Combinatorial and Geometric Group Theory, Edinburgh 1993 , pp. 105 - 110Publisher: Cambridge University PressPrint publication year: 1994
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