Groups possessing extensive hierarchical decompositions
Abstract
Kropholler's class of groups is the smallest class of groups which contains all finite groups and is closed under the following operator: whenever admits a finite-dimensional contractible -CW-complex in which all stabilizer groups are in the class, then is itself in the class. Kropholler's class admits a hierarchical structure, i.e., a natural filtration indexed by the ordinals. For example, stage 0 of the hierarchy is the class of all finite groups, and stage 1 contains all groups of finite virtual cohomological dimension. We show that for each countable ordinal , there is a countable group that is in Kropholler's class which does not appear until the st stage of the hierarchy. Previously this was known only for , 1 and 2. The groups that we construct contain torsion. We also review the construction of a torsion-free group that lies in the third stage of the hierarchy.
Cite
@article{arxiv.0908.3669,
title = {Groups possessing extensive hierarchical decompositions},
author = {T. Januszkiewicz and P. H. Kropholler and I. J. Leary},
journal= {arXiv preprint arXiv:0908.3669},
year = {2014}
}
Comments
9 pages