nLab
globular set

Context

Graph theory

Higher category theory

Globular sets

Idea
Definition
Examples
Related concepts
References

Idea

Globular sets are to simplicial sets as globes are to simplices.

They are one of the major geometric shapes for higher structures: if they satisfy a globular Segal condition then they are equivalent to strict ω-categories.

Definition

Basic definition

Definition

The globe category $𝔾$ is the category whose objects are the natural numbers, denoted here $[n] \in ℕ$ and whose morphisms are generated from

σ_{n} : [n] \to [n + 1]

τ_{n} : [n] \to [n + 1]

for all $n \in ℕ$ subject to the relations (dropping obvious subscripts)

σ \circ σ = τ \circ σ

σ \circ τ = τ \circ τ .

Definition

A globular set, also called an $ω$ -graph is a presheaf on $𝔾$ . The category of globular sets is the category of presheaves

gSet ≔ PSh (𝔾) .

Remark

This means that a globular set $X \in gSet$ is given by a collection of sets ${X_{n}}_{n \in ℕ}$ , called the sets of $n$ -globes, equipped with functions

{s_{n}, t_{n} : X_{n + 1} \to X_{n}}_{n \in ℕ}

called the $n$ -target and $n$ -source maps (or similar), such that the globular identities hold: for all $n \in ℕ$

$s_{n} \circ s_{n + 1} = s_{n} \circ t_{n + 1}$
$t_{n} \circ s_{n + 1} = t_{n} \circ t_{n + 1}$ .

Remark

The globular identities ensure that two sequences of boundary maps

f_{n} \circ \dots \circ f_{n + m - 1} \circ f_{n + m} : S_{n + m + 1} \to S_{n}

with $n, m \in ℕ$ and for $f_{k}, \in {s_{k}, t_{k}}$ are equal if and only if their last term $f_{n}$ coincides; for all $n, m \in ℕ$ we have

s_{n} \dots s_{n + 1} \circ \dots \circ s_{n + m} \circ i_{n + m} \circ \dots \circ i_{n + 1} \circ i_{n} = Id

t_{n} \dots t_{n + 1} \circ \dots \circ t_{n + m} \circ i_{n + m} \circ \dots \circ i_{n + 1} \circ i_{n} = Id .

For $S$ a globular set we may therefore write unambigously

s_{n}, t_{n} : S_{n + m + 1} \to S_{n}

i_{n} : S_{n} \to S_{n + m + 1}

with $i_{n}, s_{n}, t_{m}$ the sequence of $m$ consecutive identity-assigning, source or target maps, respectively.

Remark

The presheaf definition can understood from the point of view of space and quantity: a globular set is a space characterized by the fact that and how it may be probed by mapping standard globes into it: the set $S_{n}$ assigned by a globular set to the standard $n$ -globe $[n]$ is the set of $n$ -globes in this space, hence the way of mapping a standard $n$ -globe into this spaces.

More generally:

Definition

A globular object $X$ in a category $𝒞$ is a functor $X : 𝔾^{op} \to 𝒞$ .

Reflexive globular sets

If to the globe category we add additional generating morphisms

ι_{n} : [n + 1] \to [n]

satisfying the relations

ι \circ σ = Id

ι \circ τ = Id

we obtain the reflexive globe category, a presheaf on which is a reflexive globular set. In this case the morphism

i_{n} : = S (ι_{n}) : S_{n} \to S_{n + 1}

is called the $n$ th identity assigning map; it satisfies the globular identities:

s \circ i = Id

t \circ i = Id

$n$ -globular sets

A presheaf on the full subcategory of the globe category containing only the integers $[0]$ through $[n]$ is called an $n$ -globular set or an $n$ -graph or an $n$ -graph. An $n$ -globular set may be identified with an $∞$ -globular set which is empty above dimension $n$ .

Note that a $1$ -globular set is just a directed graph, and a $0$ -globular set is just a set.

Examples

Any strict 2-category or bicategory has an underlying 2-globular set. Likewise, any tricategory has an underlying 3-globular set. Globular sets can be used as underlying data for n-categories as well; see for instance Batanin ω-category.
A strict omega-category is a globular set $C$ equipped in each degree with the structure of a category such that for every pair $k_{1} < k_{2} \in ℕ$ the induced structure on the 2-graph $C_{k_{2}} \vec{\to} C_{k_{1}} \vec{\to} C_{0}$ is that of a strict 2-category.
The globular $n$ -globe $G_{n}$ is the globular set represented by $n$ , i.e. $G_{n} (-) : = {Hom}_{G} (-, n)$ .

Related concepts

graph
directed graph
- directed $n$ -graph
ribbon graph
Theta category,
globular theory, globular operad
Also related is the notion of computad, which is similar to a globular set in some ways, but allows “formal composites” of $n$ -cells to appear in the sources and targest of $(n + 1)$ -cells.
simplicial object
- simplicial set
- simplicial object in an (∞,1)-category
semi-simplicial object
- semisimplicial set

References

The definition is reviewed around def. 1.4.5, p. 49 of

Tom Leinster: Higher operads, higher categories (arXiv:math/0305049)

nLab
globular set

Context

Graph theory

Extra properties

Extra structure

Higher category theory

Basic concepts

Basic theorems

Applications

Models

Morphisms

Functors

Universal constructions

Extra properties and structure

1-categorical presentations

Globular sets

Idea

Definition

Basic definition

Definition

Definition

Remark

Remark

Remark

Definition

Reflexive globular sets

$n$ -globular sets

Examples

Related concepts

References

nLab globular set

Context

Graph theory

Extra properties

Extra structure

Higher category theory

Basic concepts

Basic theorems

Applications

Models

Morphisms

Functors

Universal constructions

Extra properties and structure

1-categorical presentations

Globular sets

Idea

Definition

Basic definition

Definition

Definition

Remark

Remark

Remark

Definition

Reflexive globular sets

n-globular sets

Examples

Related concepts

References

nLab
globular set

$n$ -globular sets