Classifying spaces for chains of families of subgroups

Abstract

This thesis concerns the study of the Bredon cohomological and geometric dimensions of a discrete group G with respect to a family F of subgroups of G. With that purpose, we focus on building finite-dimensional models for EF ( G ). The cases of the family Fin of finite subgroups of a group and the family VC of virtually cyclic subgroups of a group have been widely studied and many tools have been developed to relate the classifying spaces for VC with those for Fin. Given a discrete group G and an ascending chain F0 ⊂eq F1 ⊂eq … ⊂eq Fn ⊂eq … of families of subgroups of G, we provide a recursive methodology to build models for EFr ( G ) and give certain conditions under which the models obtained are finite-dimensional. We provide upper bounds for both the Bredon cohomological and geometric dimensions of G with respect to the families (Fr)r∈N utilising the classifying spaces obtained. We consider then the families Hr of virtually polycyclic subgroups of Hirsch length less than or equal to r, for r∈N. We apply the results obtained for chains of families of subgroups to the chain H0 ⊂eq H1 ⊂eq … for an arbitrary virtually polycyclic group G, proving that the corresponding Bredon dimensions are both bounded above by h(G) + r, where h(G) is the Hirsch length of G. Finally, we give similar results for the same chain of families of subgroups and an arbitrary locally virtually polycyclic group as the ambient group, obtaining in this case the upper bound h(G) + r + 1.