Book contents
- Frontmatter
- Contents
- Preface
- Introduction
- 1 Traces and Euler characteristics
- 2 Groups of virtually finite dimension
- 3 Free abelianised extensions of finite groups
- 4 Arithmetic groups
- 5 Topological methods in group theory
- 6 An example of a finite presented solvable group
- 7 SL3(Fq[t]) is not finitely presentable
- 8 Two-dimensional Poincaré duality groups and pairs
- 9 Metabelian quotients of finitely presented soluble groups are finitely presented
- 10 Soluble groups with coherent group rings
- 11 Cohomological aspects of 2-graphs. II
- 12 Recognizing free factors
- 13 Trees of homotopy types of ( m)-complexes
- 14 Geometric structure of surface mapping class groups
- 15 Cohomology theory of aspherical groups and of small cancellation groups
- 16 Finite groups of deficiency zero
- 17 Äquivalenzklassen von Gruppenbeschreibungen, Identitäten und einfacher Homotopietyp in niederen Dimensionen
- 18 Two-dimensional complexes with torsion values not realizable by self-equivalences
- 19 Applications of Nielsen's reduction method to the solution of combinatorial problems in group theory: a survey
- 20 Chevalley groups over polynomial rings
- List of problems
4 - Arithmetic groups
Published online by Cambridge University Press: 05 April 2013
- Frontmatter
- Contents
- Preface
- Introduction
- 1 Traces and Euler characteristics
- 2 Groups of virtually finite dimension
- 3 Free abelianised extensions of finite groups
- 4 Arithmetic groups
- 5 Topological methods in group theory
- 6 An example of a finite presented solvable group
- 7 SL3(Fq[t]) is not finitely presentable
- 8 Two-dimensional Poincaré duality groups and pairs
- 9 Metabelian quotients of finitely presented soluble groups are finitely presented
- 10 Soluble groups with coherent group rings
- 11 Cohomological aspects of 2-graphs. II
- 12 Recognizing free factors
- 13 Trees of homotopy types of ( m)-complexes
- 14 Geometric structure of surface mapping class groups
- 15 Cohomology theory of aspherical groups and of small cancellation groups
- 16 Finite groups of deficiency zero
- 17 Äquivalenzklassen von Gruppenbeschreibungen, Identitäten und einfacher Homotopietyp in niederen Dimensionen
- 18 Two-dimensional complexes with torsion values not realizable by self-equivalences
- 19 Applications of Nielsen's reduction method to the solution of combinatorial problems in group theory: a survey
- 20 Chevalley groups over polynomial rings
- List of problems
Summary
This is a survey of results on arithmetic groups. Only a minimal acquaintance with algebraic geometry is assumed. Theorems are mostly quoted without proof: sometimes an indication of the method is given. There is a substantial bibliography, with a guide to the subjects it covers. The reader is referred to the sources therein for the proofs omitted here.
DEFINITIONS AND GENERAL PROPERTIES ([9], [26])
Let G be an algebraic subgroup of GLn, defined over the field Q of rational numbers. Thus there exists a set of polynomials (with rational coefficients) in the n2 matrix entries and the inverse of the determinant, whose set of solutions in any extension E of Q is a subgroup GE, of GLn (E). We call GE the group of E-points of G. The groups GR and Gc are respectively real and complex Lie groups.
We write GZ for GQ ∩ GLn (Z).
Definition. A subgroup Г of GQ is arithmetic if it is commensurable with GZ: that is, if Г ∩GZ has finite index both in Г and in Gz.
A group Г is arithmetic if it can be embedded as an arithmetic subgroup in GQ for some Q-algebraic subgroup G of GLn. Then any subgroup of finite index in Г is also an arithmetic group.
Remarks. (1) We admit all subgroups commensurable with Gz, rather than Gz alone, in order to make the definition independent of the chosen Q-embedding of G in a general linear group.
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- Homological Group Theory , pp. 105 - 136Publisher: Cambridge University PressPrint publication year: 1979
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