nLab retractive space

Contents

Idea

In parameterized homotopy theory, by a retractive space (older terminology: “ex-space” [James (1995)], cf. footnote 1, p. 19 in May & Sigurdsson (2006)) one means a retraction in a given category $\mathcal{S}$ of models for homotopy types (usually in TopologicalSpaces or SimplicialSets), to be thought of as a bundle $p \colon E \to B$ of pointed topological spaces over a base space $B$ , where the section $i \colon B \to E$ exhibits the fiber-wise base points.

Just as plain pointed topological spaces serve as the basis on which to construct spectra, so retractive spaces serve as a basis on which to construct parameterized spectra.

A retractive space is a commuting diagram in a category $\mathcal{S}$ “of spaces”, of this form:

Taking the category $\mathcal{S}_{\mathcal{R}}$ of retractive spaces to have as morphisms the evident commuting diagrams

\big(\mathcal{S}_{/(-)}\big)^{\ast/} \;\colon\; \mathcal{S} \longrightarrow Cat

which sends

spaces $B \in \mathcal{B}$ to the pointed category $\big(\mathcal{S}_{/B}\big)^{\ast/}$ of pointed objects in the slice category of $\mathcal{S}$ over $B$ (i.e. in the category of “bundles” over the fixed base space $B$ ),
morphisms $f \colon B \to B'$ of base spaces to the functor $f_!$ forming pushouts of bundles along $f_!$ :

i.e.

\mathcal{S}_{\mathcal{R}} \;\simeq\; \int_{B \in \mathcal{S}} \big(\mathcal{S}_{/B}\big)^{\ast/} \,.

The terminology “ex-spaces” is due to Ioan James, used for instance in:

Early discussion of their model category structures includes

Michele Intermont, Mark Johnson, Model structures on the category of ex-spaces, Topology and its Applications 119 3 (2002) 325-353 [doi:10.1016/S0166-8641(01)00076-1]

Peter May, Johann Sigurdsson, Sections 1.3 and 8.5 of: Parametrized Homotopy Theory, Mathematical Surveys and Monographs, vol. 132, AMS 2006 (ISBN:978-0-8218-3922-5, arXiv:math/0411656, pdf)
Vincent Braunack-Mayer, Combinatorial parametrised spectra, Algebr. Geom. Topol. 21 (2021) 801-891 [arXiv:1907.08496, doi:10.2140/agt.2021.21.801]

(based on the PhD thesis, 2018)
Fabian Hebestreit, Steffen Sagave, Christian Schlichtkrull, Multiplicative parametrized homotopy theory via symmetric spectra in retractive spaces, Forum of Mathematics, Sigma 8 (2020) e16 [arXiv:1904.01824, doi:10.1017/fms.2020.11]
Cary Malkiewich, Section 2.1 in: Parametrized spectra, a low-tech approach [arXiv:1906.04773, user guide: pdf, pdf]

Last revised on April 17, 2023 at 11:25:11. See the history of this page for a list of all contributions to it.