Global model structures for $*$-modules
Algebraic Topology
2019-03-01 v2
Abstract
We extend Schwede's work on the unstable global homotopy theory of orthogonal spaces and -spaces to the category of -modules (i.e., unstable -modules). We prove a theorem which transports model structures and their properties from -spaces to -modules and show that the resulting global model structure for -modules is monoidally Quillen equivalent to that of orthogonal spaces. As a consequence, there are induced Quillen equivalences between the associated model categories of monoids, which identify equivalent models for the global homotopy theory of -spaces.
Cite
@article{arxiv.1607.00144,
title = {Global model structures for $*$-modules},
author = {Benjamin Böhme},
journal= {arXiv preprint arXiv:1607.00144},
year = {2019}
}
Comments
22 pages. Small changes to the class of cofibrations, due to changes in the main reference, arXiv:1711.06019. Improved exposition and minor revisions in response to a referee report