nLab weak complicial set

Redirected from "weak complicial sets".

Contents

Context

Higher category theory

Idea
Definition
Model structure
Examples
References

Idea

Weak complicial sets are simplicial sets with extra structure that are closely related to the ∞-nerves of weak ∞-categories.

The goal of characterizing such nerves, without an a priori definition of “weak $\omega$ -category” to start from, is called simplicial weak ∞-category theory. It is expected that the (nerves of) weak $\omega$ -categories will be weak complicial sets satisfying an extra “saturation” condition ensuring that “every equivalence is thin.” General weak complicial sets can be regarded as “presentations” of weak $\omega$ -categories.

Weak complicial sets are a joint generalization of

Definition

Let

$\Delta^k[n]$ be the stratified simplicial set whose underlying simplicial set is the $n$ -simplex $\Delta[n]$ , and whose marked cells are precisely those simplices $[r] \to [n]$ that contain $\{k-1, k, k+1\} \cap [n]$ ;
$\Lambda^k[n]$ be the stratified simplicial set whose underlying simplicial set is the $k$ -horn of $\Delta[n]$ , with marked cells those that are marked in $\Delta^k[n]$ ;
$\Delta^k[n]'$ be obtained from $\Delta^k[n]$ by making the $(k-1)$ st $(n-1)$ -face and the $(k+1)$ st $(n-1)$ face thin;
$\Delta^k[n]''$ be obtained from $\Delta^k[n]$ by making all $(n-1)$ -faces thin.

An elementary anodyne extension in $Strat$ , the category stratified simplicial sets is

a complicial horn extension $\Lambda^k[n] \stackrel{\subset_r}{\hookrightarrow} \Delta^k[n]$

a complicial thinness extension $\Delta^k[n]' \stackrel{\subset_e}{\hookrightarrow} \Delta^k[n]''$

for $n = 1,2, \cdots$ and $k \in [n]$ .

Definition

A stratified simplicial set is a weak complicial set if it has the right lifting property with respect to all

$\Lambda^k[n] \stackrel{\subset_r}{\hookrightarrow} \Delta^k[n]$ and $\Delta^k[n]' \stackrel{\subset_e}{\hookrightarrow} \Delta^k[n]''$

A complicial set is a weak complicial set in which such liftings are unique.

Model structure

There is a model category structure that presents the (infinity,1)-category of weak complicial sets, hence that of weak $\omega$ -categories. See

model structure for weak complicial sets.

Examples

For $C$ a strict ∞-category and $N(C)$ its ∞-nerve, the Roberts stratification which regards each identity morphism as a thin cell makes $N(C)$ a strict complicial set, hence a weak complicial set. This example is not “saturated.”
There is also the stratification of $N(C)$ which regards each $\omega$ -equivalence morphism as a thin cell. $N(C)$ with this stratification is a weak complicial set (example 17 of Ver06). This should be the “saturation” of the previous example, and exhibits the inclusion of strict $\omega$ -categories into weak ones.
A simplicial set is a weak complicial set when equipped with its maximal stratification (every simplex of dimension $\gt 0$ is thin) if and only if it is a Kan complex. This example is, of course, saturated, and is viewed as embedding $\omega$ -groupoids into $\omega$ -categories.
A simplicial set is a quasi-category if and only if it is a weak complicial set when equipped with the stratification in which every simplex of dimension $\gt 1$ is thin, and only degenerate 1-simplices are thin. This example is not saturated; in its saturation the thin 1-simplices are the internal equivalences in a quasi-category (equivalently, those that become isomorphisms in its homotopy category). It presents the embedding of $(\infty,1)$ -categories into weak $\omega$ -categories.

Note that 1-simplex equivalences in a quasi-category are automatically preserved by simplicial maps between quasi-categories; this is why $QCat$ can “correctly” be regarded as a full subcategory of $sSet$ . This is not true at higher levels; for instance not every simplicial map between nerves of strict $\omega$ -categories necessarily preserves $\omega$ -equivalence morphisms.

References

The definition of weak complicial sets is definition 14, page 9 of

Dominic Verity, Weak complicial sets Part I: Basic homotopy theory (arXiv)

Further developments are in

Dominic Verity, Weak complicial sets Part II: Nerves of complicial Gray-categories (arXiv)

A model category structure on stratified simplicial sets modelling $(\infty,n)$ -categories in the guise of $n$ -complicial sets:

Viktoriya Ozornova, Martina Rovelli, Model structures for (∞,n)-categories on (pre)stratified simplicial sets and prestratified simplicial spaces, Algebr. Geom. Topol. 20 (2020) 1543-1600 [arxiv:1809.10621, doi:10.2140/agt.2020.20.1543]

A Quillen adjunction relating $n$ -complicial sets to $n$ -fold complete Segal spaces:

Viktoriya Ozornova, Martina Rovelli, A Quillen adjunction between globular and complicial approaches to $(\infty,n)$ -categories, Advances in Mathematics
421 (2023) 108980 [doi:10.1016/j.aim.2023.108980, arXiv:2206.02689]

Review:

Martina Rovelli, $n$ -Complicial sets as a model for $(\infty,n)$ -categories, talk at CQTS (2023) [web, video: YT]

Last revised on September 13, 2023 at 21:50:06. See the history of this page for a list of all contributions to it.

nLab weak complicial set

Context

Higher category theory

Basic concepts

Basic theorems

Applications

Models

Morphisms

Functors

Universal constructions

Extra properties and structure

1-categorical presentations

Contents

Idea

Definition

Definition

Definition

Model structure

Examples

References