model structure on cosimplicial rings in nLab

Context

Model category theory

Idea
Definition
- The model category structure
- The simplicial model category structure
References

Idea

The standard model category structure on cosimplicial objects in unital, commutative algebras over $k$ .

Under the monoidal Dold-Kan correspondence this is Quillen equivalent to the model structure on commutative non-negative cochain dg-algebras.

Definition

Write ${Alg}_{k}^{Δ}$ for the category of cosimplicial objects in the category of unital, commutative $k$ -algebras. Sending algebras to their underlying $k$ -modules yields a forgetful functor

U : {Alg}_{k}^{Δ} \to k {Mod}^{Δ} .

The model category structure

The Dold-Kan correspondence provides the normalized cochain complex (Moore complex) functor

N : k {Mod}_{k}^{Δ} \to {Ch}^{•} (k)_{+} .

Define a morphism $f : A \to B$ of cosimplicial algebras is a morphism is a weak equivalence if

N (U (f)) : N (U (A)) \to N (U (B))

is a quasi-isomorphism in ${Ch}_{+}^{•} (k)$ .

Say a morphism of cosimplicial algebras is a fibration if it is a epimorphism (degreewise surjection).

This defines the projective model category structure on ${Alg}_{k}^{Δ}$ .

The simplicial model category structure

There is also the structure of an sSet-enriched category of ${Alg}_{k}^{Δ}$ .

Definition

For $X$ a simplicial set and $A \in {Alg}_{k}$ let $A^{X} \in {Alg}_{k}^{Δ}$ be the corresponding $A$ -valued cochains on simplicial sets

A^{X} : [n] \mapsto \prod_{X_{n}} A_{n} .

Remark

If we write $C (X) : = {Hom}_{Set} (X_{•}, k)$ for the cosimplicial algebra of cochains on simplicial sets then for $X$ degreewise finite this may be written as

A^{X} = A \otimes C (X)

where the tensor product is the degreewise tensor product of $k$ -algebras.

Definition

For $A, B \in {Alg}_{k}^{Δ}$ define the sSet-hom-object ${Alg}_{k}^{Δ} (A, B)$ by

{Alg}_{k}^{Δ} (A, B) : = {Hom}_{sSet} (A, B^{Δ [•]}) = {Hom}_{sSet} (A, B \otimes C (Δ [•])) \in sSet .

Remark

For $B \in {Alg}_{k}$ regarded as a constant cosimplicial object under the canonical embedding ${Alg}_{k} ↪ {Alg}_{k}^{Δ}$ we have

{Alg}_{k}^{Δ} (A, B^{Δ [n]}) = {Alg}_{k}^{Δ} (A, B \otimes C (Δ [n])) ≃ {Alg}_{k} (A_{n}, B) .

Proof

Let $f : A \to B \otimes C (Δ [n])$ be a morphism of cosimplicial algebras and write

f_{n} : A_{n} \to B

for the component of $f$ in degree $n$ with values in the copy $B = B \otimes k$ of functions $k$ on the unique non-degenerate $n$ -simplex of $Δ [n]$ . The $n + 1$ coface maps $C (Δ [n])_{n} \leftarrow C (Δ [n])_{n - 1}$ obtained as the pullback of the $(n + 1)$ face inclusions $Δ [n - 1] \to Δ [n]$ restrict on the non-degenerate $(n - 1)$ -cells to the $n + 1$ projections $k \leftarrow k^{n + 1} : p_{i}$ .

Accordingly, from the naturality squares for $f$

\begin{matrix} A_{n} & \overset{f_{n}}{\to} & B \\ ↑^{δ_{i}} & ↑^{p_{i}} \\ A_{n - 1} & \overset{f_{n - 1}}{\to} & B^{n + 1} \end{matrix}

the bottom horizontal morphism is fixed to have components

$f_{n - 1} = (f_{n} \circ δ_{0}, \dots, f_{n} \circ δ_{n})$

in the functions on the non-degenerate simplices.

By analogous reasoning this fixes all the components of $f$ in all lower degrees with values in the functions on degenerate simplices.

The above sSet-enrichment makes ${Alg}_{k}^{Δ}$ into a simplicially enriched category which is tensored and cotensored over $sSet$ .

And this is compatible with the model category structure:

Theorem

With the definitions as above, ${Alg}_{k}^{Δ}$ is a simplicial model category.

Proof

To06, theorem 2.1.2

Under the monoidal Dold-Kan correspondence this is related to the model structure on commutative non-negative cochain dg-algebras.

References

Details are in section 2.1 of

Bertrand Toen, Affine stacks (Champs affines) (arXiv:math/0012219) .

nLab
model structure on cosimplicial rings

Context

Model category theory

Definitions

Morphisms

Universal constructions

Refinements

Producing new model structures

Presentation of $(∞, 1)$ -categories

Model structures

for $∞$ -groupoids

for $n$ -groupoids

for $∞$ -groups

for $∞$ -algebras

general

specific

for stable/spectrum objects

for $(∞, 1)$ -categories

for stable $(∞, 1)$ -categories

for $(∞, 1)$ -operads

for $(n, r)$ -categories

for $(∞, 1)$ -sheaves / $∞$ -stacks

Contents

Idea

Definition

The model category structure

The simplicial model category structure

Definition

Remark

Definition

Remark

Proof

Theorem

Proof

References

nLab model structure on cosimplicial rings

Context

Model category theory

Definitions

Morphisms

Universal constructions

Refinements

Producing new model structures

Presentation of (∞,1)-categories

Model structures

for ∞-groupoids

for n-groupoids

for ∞-groups

for ∞-algebras

general

specific

for stable/spectrum objects

for (∞,1)-categories

for stable (∞,1)-categories

for (∞,1)-operads

for (n,r)-categories

for (∞,1)-sheaves / ∞-stacks

Contents

Idea

Definition

The model category structure

The simplicial model category structure

Definition

Remark

Definition

Remark

Proof

Theorem

Proof

References

nLab
model structure on cosimplicial rings

Presentation of $(∞, 1)$ -categories

for $∞$ -groupoids

for $n$ -groupoids

for $∞$ -groups

for $∞$ -algebras

for $(∞, 1)$ -categories

for stable $(∞, 1)$ -categories

for $(∞, 1)$ -operads

for $(n, r)$ -categories

for $(∞, 1)$ -sheaves / $∞$ -stacks