Coronas for properly combable spaces
Abstract
This paper is a systematic approach to the construction of coronas (i.e. Higson dominated boundaries at infinity) of combable spaces. We introduce three additional properties for combings: properness, coherence and expandingness. Properness is the condition under which our construction of the corona works. Under the assumption of coherence and expandingness, attaching our corona to a Rips complex construction yields a contractible -compact space in which the corona sits as a -set. This results in bijectivity of transgression maps, injectivity of the coarse assembly map and surjectivity of the coarse co-assembly map. For groups we get an estimate on the cohomological dimension of the corona in terms of the asymptotic dimension. Furthermore, if the group admits a finite model for its classifying space , then our constructions yield a -structure for the group.
Cite
@article{arxiv.1711.06836,
title = {Coronas for properly combable spaces},
author = {Alexander Engel and Christopher Wulff},
journal= {arXiv preprint arXiv:1711.06836},
year = {2021}
}
Comments
v2: minor improvements, 92 pages v3: final version, accepted by Journal of Topology and Analysis