Geometric Group Theory
Geometric Group Theory
Volume 1:
July 1993
1
Available
Paperback
9780521435291
$72.00
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eBook
These two volumes contain survey papers given at the 1991 international symposium on geometric group theory, and they represent some of the latest thinking in this area. Many of the world's leading figures in this field attended the conference, and their contributions cover a wide diversity of topics. Volume I contains reviews of such subjects as isoperimetric and isodiametric functions, geometric invariants of a groups, Brick's quasi-simple filtrations for groups and 3-manifolds, string rewriting, and algebraic proof of the torus theorem, the classification of groups acting freely on R-trees, and much more. Volume II consists solely of a ground breaking paper by M. Gromov on finitely generated groups.
- Latest work on group theory
- Acknowledged experts have contributed
Product details
July 1993Paperback
9780521435291
224 pages
229 × 152 × 12 mm
0.34kg
Available
Table of Contents
- 1. Group actions and Riemann surfaces
- 2. The virtual cohomological dimension of Coxeter groups
- 3. The geometric invariants of a group - a survey with emphasis on the homological approach
- 4. String rewriting - a survey for group theorists
- 5. One-relator products with high powered relators
- 6. An inaccessible group
- 7. Isoperimetric and isodiametric functions - a survey
- 8. On Hilbert's metric for simplices
- 9. Software for axiomatic groups, isomorphism testing and finitely presented groups
- 10. Proving certain groups infinite
- 11. Some applications of small cancellation theory to one-relator groups and one-relator products
- 12. A group theoretic proof of the torus theorem
- 13. N-torsion and applications
- 14. Surface groups and quasi-convexity
- 15. Constructing group actions on trees
- 16. Brick's quasi-simple filtrations for groups and 3-manifolds
- 17. A note an accessibility
- 18. Geometric group theory
- 1991 problem list.
