arXiv:math/0312046 Abstract

arXiv:math/0312046 [math.AT]Abstract References Reviews Resources

Continuous Control and the Algebraic L-theory Assembly Map

Published 2003-12-02Version 1

In this work, the assembly map in L-theory for the family of finite subgroups is proven to be a split injection for a class of groups. Groups in this class, including virtually polycyclic groups, have universal spaces that satisfy certain geometric conditions. The proof follows the method developed by Carlsson-Pedersen to split the assembly map in the case of torsion free groups. Here, the continuously controlled techniques and results are extended to handle groups with torsion.

Comments: 15 pages

Journal: Forum Math. 18 (2006), no. 2, 193--209

Categories: math.AT, math.KT

Subjects: 18F25

Keywords: algebraic l-theory assembly map, continuous control, torsion free groups, virtually polycyclic groups, finite subgroups

Tags: journal article

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Continuous Control and the Algebraic L-theory Assembly Map

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Continuous Control and the Algebraic L-theory Assembly Map

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arXiv:math/0312046 [math.AT]Abstract References Reviews Resources