nLab
monoidal model category

Context

Model category theory

Monoidal categories

Idea
Definition
Properties
Examples
- Model structure on $G$ -objects
- Model structure on monoids
Related concepts
References

Idea

A monoidal model category is a model category which is also a closed monoidal category in a compatible way. In particular, its homotopy category inherits a closed monoidal structure.

Definition

A (symmetric) monoidal model category is a category equipped with

the structure of a closed symmetric monoidal category
the structure of a model category;

such that

the pushout-product axiom is satisfied, and
For any cofibrant object $X$ , the map $Q e \otimes X \to e \otimes X ≅ X$ is a weak equivalence, where $e$ is the unit object of the monoidal structure and $Q e \to e$ is a cofibrant resolution for it. This is automatically satisfied if $e$ is cofibrant, as it is in most (but not all) cases.

Properties

The central fact about a monoidal model category is that its homotopy category inherits a closed monoidal structure.

Examples

A nice category of topological spaces with cartesian product and the usual (Quillen) model structure.
The category of simplicial sets with cartesian product and the usual (Quillen) model structure.
The category Cat with cartesian product and the folk model structure.
The category Gray of strict 2-categories with the Gray tensor product and the Lack model structure?.
The category of chain complexes with the usual tensor product of chain complexes and the projective model structure.
The category of pointed compactly generated topological spaces or simplicial sets with the smash product.
Any of many modern model categories of spectra. The standard example of a monoidal model category whose unit is not cofibrant is the category of EKMM S-modules.

Model structure on $G$ -objects

Assumption

Let $ℰ$ be a category equipped with the structure of

such that

the model structure is cofibrantly generated;
the tensor unit $I$ is cofibrant.

Proposition

Under these conditions there is for each finite group $G$ the structure of a monoidal model category on the category $ℰ^{B G}$ of objects in $ℰ$ equipped with a $G$ -action, for which the forgetful functor

ℰ^{B G} \to ℰ

preserves and reflects fibrations and weak equivalences.

See for instance (BergerMoerdijk 2.5).

Model structure on monoids

See model structure on monoids in a monoidal model category.

Related concepts

References

A general standard reference is

Mark Hovey, Model Categories

The monoidal model structure on $ℰ^{B G}$ is discussed for insztance in

Clemens Berger, Ieke Moerdijk, The Boardman-Vogt resolution of operads in monoidal model categories , Topology 45 (2006), 807–849.

Revised on June 8, 2013 22:50:45 by Adeel Khan (129.173.251.24)

nLab monoidal model category

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

Monoidal categories

With symmetry

With duals for objects

With duals for morphisms

With traces

Closed structure

Special sorts of products

Semisimplicity

Morphisms

Examples

Theorems

In higher category theory

Contents

Idea

Definition

Properties

Examples

Model structure on G-objects

Assumption

Proposition

Model structure on monoids

Related concepts

References

nLab
monoidal model category

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

Model structure on $G$ -objects