nLab pushout-product axiom

Contents

Context

Model category theory

Monoidal categories

Idea
Definition
Remarks
Related concepts
References

Idea

The pushout-product axiom is a compatibility condition between

a closed $\,$ symmetric monoidal structure
a model category structure

on a category.

Closed $\;$ symmetric monoidal categories and having a model category structure, that satisfies the pushout-product axiom, together with a unit condition, are called monoidal model categories and hence are in particular closed monoidal homotopical categories.

This is relevant in enriched homotopy theory, which pairs enriched category theory with homotopy theory.

Definition

Let $C$ be a closed symmetric monoidal category equipped with a model category structure.

Then $C$ satisfies the pushout-product axiom if for any pair of cofibrations $f : X \to Y$ and $f' \colon X' \to Y'$ their pushout-product, hence the induced morphism out of the coproduct

(X \otimes Y') \coprod_{X \otimes X'} (Y \otimes X') \to Y \otimes Y' \,,

is itself a cofibration, which, furthermore, is acyclic if $f$ or $f'$ is.

This means that the tensor product

\otimes \colon C \times C \to C

is a left Quillen bifunctor.

If the monoidal category underlying $C$ is a closed monoidal category, one can dually define the pullback-power axiom to mean that if $f \colon A \to B$ is a cofibration and $g \colon X \to Y$ is a fibration, their pullback power

[B, X] \to [A, X] \times_{[A,Y]} [B, Y] \,,

is a fibration, which, furthermore, is acyclic if $f$ or $g$ is.

However, by Joyal-Tierney calculus, the pullback-power axiom holds if and only if the pushout-power axiom holds.

Remarks

This implies in particular that tensoring with cofibrant objects preserves cofibrations and acyclic cofibrations.
However the tensor product of two (acyclic) cofibrations is in general not an (acyclic) cofibration.
The pushout-product axiom makes sense more generally in the context of a two-variable adjunction between model categories. This is important in enriched homotopy theory.

Related concepts

monoidal model category
dually: pullback-power axiom in enriched model categories
Joyal-Tierney calculus

References

Discussion for model $\infty$ -categories (such as with homotopy Kan fibrations):

Aaron Mazel-Gee, around Def. 4.3 in: Model ∞-categories II: Quillen adjunctions, New York Journal of Mathematics 27 (2021) 508-550. [arXiv:1510.04392, nyjm:27-21]

Last revised on July 7, 2022 at 08:43:11. See the history of this page for a list of all contributions to it.

nLab pushout-product axiom

Context

Model category theory

Definitions

Morphisms

Universal constructions

Refinements

Producing new model structures

Presentation of (∞,1)(\infty,1)-categories

Model structures

for ∞\infty-groupoids

for equivariant ∞\infty-groupoids

for rational ∞\infty-groupoids

for rational equivariant ∞\infty-groupoids

for nn-groupoids

for ∞\infty-groups

for ∞\infty-algebras

general

specific

for stable/spectrum objects

for (∞,1)(\infty,1)-categories

for stable (∞,1)(\infty,1)-categories

for (∞,1)(\infty,1)-operads

for (n,r)(n,r)-categories

for (∞,1)(\infty,1)-sheaves / ∞\infty-stacks

Monoidal categories

With symmetry

With duals for objects

With duals for morphisms

With traces

Closed structure

Special sorts of products

Semisimplicity

Morphisms

Internal monoids

Examples

Theorems

In higher category theory

Contents

Idea

Definition

Remarks

Related concepts

References

Presentation of $(\infty,1)$ -categories

for $\infty$ -groupoids

for equivariant $\infty$ -groupoids

for rational $\infty$ -groupoids

for rational equivariant $\infty$ -groupoids

for $n$ -groupoids

for $\infty$ -groups

for $\infty$ -algebras

for $(\infty,1)$ -categories

for stable $(\infty,1)$ -categories

for $(\infty,1)$ -operads

for $(n,r)$ -categories

for $(\infty,1)$ -sheaves / $\infty$ -stacks