Abstract
It was claimed in [Rosenthal D.: Continuous control and the algebraic L-theory assembly map. Forum Math. 18 (2006), 193–209] that virtually polycyclic groups admit a universal space for proper actions that satisfy the geometric assumptions of the main theorem there. However, it is unknown in general if such a space exists for these groups. In order to prove that the given assembly map for virtually polycyclic groups is a split injection, one can use [Bartels A. and Rosenthal D.: On the K-theory of groups with finite asymptotic dimension. Preprint 2006 arXiv:math.KT/0605088 v2].
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