Classifying spaces for families of subgroups of 8-located groups
Abstract
We investigate the structure of the minimal displacement set in 8-located complexes with the SD'-property. We show that such set embeds isometrically into the complex. Since 8-location and simple connectivity imply Gromov hyperbolicity, the minimal displacement set in such complex is systolic. Using these results, we construct a low-dimensional classifying space for the family of virtually cyclic subgroups of a group acting properly on an 8-located complex with the SD'-property.
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