model structure on cosimplicial rings in nLab

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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 monomorphism (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 ${Alg}_{k}^{Δ}$ .

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} .

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

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

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

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 .

This 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

definition

constructions

refinements

presentation of $(∞,1)$ -categories

model structures

Contents

Idea

Definition

The model category structure

The simplicial model category structure

Theorem

Proof

References

nLab model structure on cosimplicial rings

definition

constructions

refinements

presentation of (∞,1)-categories

model structures

Contents

Idea

Definition

The model category structure

The simplicial model category structure

Theorem

Proof

References

nLab
model structure on cosimplicial rings

presentation of $(∞,1)$ -categories