| A Universal Construction for Groups Acting Freely on Real Trees Contributor(s): Chiswell, Ian (Author), Müller, Thomas (Author) |
|
 |
ISBN: 1107024811 ISBN-13: 9781107024816 Publisher: Cambridge University Press OUR PRICE: $134.90 Product Type: Hardcover - Other Formats Published: November 2012 |
| Additional Information |
| BISAC Categories: - Mathematics | Algebra - General |
| Dewey: 512.2 |
| Series: Cambridge Tracts in Mathematics |
| Physical Information: 1" H x 5.9" W x 9" (1.20 lbs) 297 pages |
| Descriptions, Reviews, Etc. |
| Publisher Description: The theory of R-trees is a well-established and important area of geometric group theory and in this book the authors introduce a construction that provides a new perspective on group actions on R-trees. They construct a group RF(G), equipped with an action on an R-tree, whose elements are certain functions from a compact real interval to the group G. They also study the structure of RF(G), including a detailed description of centralizers of elements and an investigation of its subgroups and quotients. Any group acting freely on an R-tree embeds in RF(G) for some choice of G. Much remains to be done to understand RF(G), and the extensive list of open problems included in an appendix could potentially lead to new methods for investigating group actions on R-trees, particularly free actions. This book will interest all geometric group theorists and model theorists whose research involves R-trees. |
Contributor Bio(s): Chiswell, Ian: - Ian Chiswell is Emeritus Professor in the School of Mathematical Sciences at Queen Mary, University of London. His main area of research is geometric group theory, especially the theory of Λ-trees. Other interests have included cohomology of groups and ordered groups.Muller, Thomas: - Thomas Müller is Professor in the School of Mathematical Sciences at Queen Mary, University of London. His main research interests are in geometric, combinatorial and asymptotic group theory, in algebraic combinatorics, number theory and (mostly complex) analysis. |