Starting from basic knowledge of nilpotent (Lie) groups, an algebraic theory of almost-Bieberbach groups, the fundamental groups of infra-nilmanifolds, is developed. These are a natural generalization of the well known Bieberbach groups and many results about ordinary Bieberbach groups turn out to generalize to the almost-Bieberbach groups. Moreover, using affine representations, explicit cohomology computations can be carried out, or resulting in a classification of the almost-Bieberbach groups in low dimensions. The concept of a polynomial structure, an alternative for the affine structures that sometimes fail, is introduced.
Author(s): Karel Dekimpe (auth.)
Series: Lecture Notes in Mathematics 1639
Edition: 1
Publisher: Springer-Verlag Berlin Heidelberg
Year: 1996
Language: English
Pages: 262
Tags: Group Theory and Generalizations; Differential Geometry
Preliminaries and notational conventions....Pages 1-11
Infra-nilmanifolds and Almost-Bieberbach groups....Pages 13-30
Algebraic characterizations of almost-crystallographic groups....Pages 31-46
Canonical type representations....Pages 47-102
The Cohomology of virtually nilpotent groups....Pages 103-120
Infra-nilmanifolds and their topological invariants....Pages 121-157
Classification survey....Pages 159-230
