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A model category is a category equipped with notions of weak equivalences, fibrations and cofibrations allowing to run arguments similar to those of classical homotopy theory.
2
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1
answer
215
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In what generality does the following statement hold: A fibration is acyclic if and only if ...
This may not be precise enough for MO, but I'll give it a go.
Let $M$ be a symmetric closed monoidal model category with unit $u\in Ob(M)$. We define the vertices of an object $A$ to be points $x\in …
4
votes
0
answers
1k
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When are "diagrams of cofibrations" projectively cofibrant?
Let $P$ be a small category, and let $F:P\to M$ be a diagram in a left-proper combinatorial model category $M$. We say that $F$ is a diagram of cofibrations if for every object $p\in P$, $F(p)$ is co …
3
votes
2
answers
269
views
Excellent monoidal model categories admit enriched fibrant replacement functors?
Let $\mathbf{S}$ be an excellent model category in which all objects are cofibrant, viewed as an $\mathbf{S}$-enriched category by its canonical self-enrichment. Then we know that there is an obvious …
6
votes
1
answer
192
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Inductive folk model structure on strict ω-categories
There is a paper of Lafont, Metayer, and Worytkiewicz [1] that constructs a model structure on the category of strict $\omega$-categories that they call the folk model structure. This model structure …
13
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3
answers
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What is the "universal problem" that motivates the definition of homotopy limits/colimits (a...
The ordinary notions of limit and colimit are universal solutions to a problem, specifically, finding terminal/initial objects in slice/coslice categories. In the context of homotopy right Kan extens …
7
votes
0
answers
248
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Product-preserving fibrant replacement functor for the Joyal model structure
There are a few fibrant replacement functors for the Quillen model structure on simplicial sets that preserve finite cartesian products, namely $\operatorname{Ex}^\infty$ and $\operatorname{Sing}(|\cd …
8
votes
0
answers
119
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Explicit data for $E_n$-monoidal model and simplicial categories
The definition of a monoidal model category requires that the tensor product is biclosed (such is needed to ensure that the tensor product is derivable in both variables). Obviously, in the situation …
5
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0
answers
93
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Classification of combinatorial model categories presentable by simplicial presheaves on a R...
Dan Dugger proved that every combinatorial model category can be obtained up to Quillen equivalence as the localization of a model structure on simplicial presheaves on a small category $C$.
Is there …
4
votes
1
answer
310
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Model category with formally smooth morphisms as fibrations?
Let's view the category of algebraic spaces as a full subcategory of the category of "spaces" over the opposite category of commutative rings, that is, the category of sheaves on $CRing^{op}$ in the é …
1
vote
1
answer
364
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Analogs of left, right, inner, and Kan fibrations in CGWH
It is a theorem that the category of compactly generated weakly Hausdorff (CGWH) spaces is Quillen equivalent to the category of simplicial sets with the Kan model structure. However, I know next to …
3
votes
1
answer
458
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Slick verification of the model category axioms for Spaces and SSets with the q-model struct...
We choose our category of spaces to be compactly generated weak Hausdorff spaces for convenience, denoted $CGWH$.
Questions:
1.) Is there any sort of slick argument to verify that CGWH with the Qu …
8
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0
answers
667
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An Ex functor for the contravariant homotopy structure
I'm going to slack on the background and get to the point:
Is there a good notion of an $Sd/Ex$ adjunction for $sSet/S$ equipped with
the contravariant model structure (cofibrations are monomorphisms …
12
votes
1
answer
1k
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Is the simplicial completion of a localizer always a bousfield localization of the injective...
Background
Recall (from Cisinski's Astérisque volume 308) that given a small category $A$, we define an $A$-localizer to be a class $W$ of morphisms of $\mathrm{Psh}(A)$ satisfying the following axio …
14
votes
1
answer
494
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Weak complicial sets: Are the morphisms too strict?
In Verity's first paper on weak complicial sets, he shows that every strict complicial set is a weak complicial set. He also showed in an earlier paper that the full subcategory of stratified simplic …
9
votes
1
answer
1k
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Fibered/cofibered higher categories, relative model structures, slicing, and (∞,2)-category ...
Jacob Lurie defined a model structure on the category of marked simplicial sets sliced over a fixed simplicial set $S$ called the cartesian model structure. (For a definition, see here or HTT Ch.3.1) …