2013
DOI: 10.2140/agt.2013.13.1857
|View full text |Cite
|
Sign up to set email alerts
|

Diagram spaces, diagram spectra and spectra of units

Abstract: This article compares the infinite loop spaces associated to symmetric spectra, orthogonal spectra, and EKMM S-modules. Each of these categories of structured spectra has a corresponding category of structured spaces that receives the infinite loop space functor Ω ∞ . We prove that these models for spaces are Quillen equivalent and that the infinite loop space functors Ω ∞ agree. This comparison is then used to show that two different constructions of the spectrum of units gl 1 R of a commutative ring spectrum… Show more

Help me understand this report
View preprint versions

Search citation statements

Order By: Relevance

Paper Sections

Select...
2
1
1
1

Citation Types

0
50
0

Year Published

2013
2013
2024
2024

Publication Types

Select...
7

Relationship

0
7

Authors

Journals

citations
Cited by 46 publications
(50 citation statements)
references
References 30 publications
0
50
0
Order By: Relevance
“…An I c -FCP gives rise to an E ∞ -space structured by the linear isometries operad L; specifically, T (R ∞ ) = colim V T (V ) is an L-space with the operad maps induced by the Whitney sum [14, 1.9; 15, 23.6.3]. In fact, as alluded to above, one can set up a Quillen equivalence between the category of I c -FCPs and the category of E ∞ -spaces, although we do not discuss this matter herein (see [10] for a nice treatment of this comparison).…”
Section: The 'Neo-classical' Thom Spectrum Functormentioning
confidence: 99%
“…An I c -FCP gives rise to an E ∞ -space structured by the linear isometries operad L; specifically, T (R ∞ ) = colim V T (V ) is an L-space with the operad maps induced by the Whitney sum [14, 1.9; 15, 23.6.3]. In fact, as alluded to above, one can set up a Quillen equivalence between the category of I c -FCPs and the category of E ∞ -spaces, although we do not discuss this matter herein (see [10] for a nice treatment of this comparison).…”
Section: The 'Neo-classical' Thom Spectrum Functormentioning
confidence: 99%
“…When F = e is the global family of trivial groups, we recover the Quillen equivalence established by Lind in [16,Thm. 9.9].…”
Section: L-spaces and Orthogonal Spacesmentioning
confidence: 65%
“…By [16,Lemma 8.3], the functor Q⊗ L − from orthogonal spaces to L-spaces is strong symmetric monoidal for the box product of orthogonal spaces (compare [21, Sec. 1.3]) and the operadic product ⊠ L of L-spaces.…”
Section: L-spaces and Orthogonal Spacesmentioning
confidence: 99%
“…Of course, one can instead replace the given commutative S-algebra by an associative S-algebra instead, but in this case it is impossible to recover the E ∞ structure on GL 1 R. To describe GL 1 R in this setting requires a different construction; see [32] or [19] for a description.…”
Section: The Space Of Unitsmentioning
confidence: 99%
“…The observation that one could carry out the program of [12] in the setting of spaces is due to Mike Mandell, and was worked out in the thesis of the second author [6]. A detailed presentation of the theory (along with complete proofs) has appeared in [7] (and see also [19]).…”
Section: A ∞ Thom Spectra and Orientationsmentioning
confidence: 99%