2-category

2-category

In category theory, a 2-category is a category with "morphisms between morphisms"; that is, where each hom set itself carries the structure of a category. It can be formally defined as a category enriched over Cat (the category of categories and functors, with the monoidal structure given by product of categories).

Contents

Definition

A 2-category C consists of:

  • A class of 0-cells (or objects) A, B, ....
  • For all objects A and B, a category \mathbf{C}(A,B). The objects f,g:A\to B of this category are called 1-cells and its morphisms \alpha:f\Rightarrow g are called 2-cells; the composition in this category is usually written \circ or \circ_1 and called vertical composition or composition along a 1-cell.
  • For any object A there is a functor from the terminal category (with one object and one arrow) to \mathbf{C}(A,A), that picks out the identity 1-cell idA on A and its identity 2-cell ididA. In practice these two are often denoted simply by A.
  • For all objects A, B and C, there is a functor \circ_0 : \mathbf{C}(B,C)\times\mathbf{C}(A,B)\to\mathbf{C}(A,C), called horizontal composition or composition along a 0-cell, which is associative and admits the identity 2-cells of idA as identities. The composition symbol \circ_0 is often omitted, the horizontal composite of 2-cells \alpha:f\Rightarrow g:A\to B and \beta:f'\Rightarrow g':B\to C being written simply as \beta\alpha:f'f\Rightarrow g'g:A\to C.

The notion of 2-category differs from the more general notion of a bicategory in that composition of 1-cells (horizontal composition) is required to be strictly associative, whereas in a bicategory it need only be associative up to a 2-isomorphism. The axioms of a 2-category are consequences of their definition as Cat-enriched categories:

  • Vertical composition is associative and unital, the units being the identity 2-cells idf.
  • Horizontal composition is also (strictly) associative and unital, the units being the identity 2-cells A=id_{id_A} on the identity 1-cells idA.
  • The interchange law holds; i.e. it is true that for composable 2-cells α,β,γ,δ
(\alpha\circ_0\beta)\circ_1(\gamma\circ_0\delta) = (\alpha\circ_1\gamma)\circ_0(\beta\circ_1\delta)

The interchange law follows from the fact that \circ_0 is a functor between hom categories. It can be drawn as a pasting diagram as follows:

Interchange-Law.png

Here the left-hand diagram denotes the vertical composition of horizontal composites, the right-hand diagram denotes the horizontal composition of vertical composites, and the diagram in the centre is the customary representation of both.

Doctrines

In mathematics, a doctrine is simply a 2-category which is heuristically regarded as a system of theories. For example, algebraic theories, as invented by Lawvere, is an example of a doctrine, as are multi-sorted theories, operads, categories, and toposes.

The objects of the 2-category are called theories, the 1-morphisms f\colon A\rightarrow B are called models of the A in B, and the 2-morphisms are called morphisms between models.

The distinction between a 2-category and a doctrine is really only heuristic: one does not typically consider a 2-category to be populated by theories as objects and models as morphisms. It is this vocabulary that makes the theory of doctrines worth while.

For example, the 2-category Cat of categories, functors, and natural transformations is a doctrine. One sees immediately that all presheaf categories are categories of models.

As another example, one may take the subcategory of Cat consisting only of categories with finite products as objects and product-preserving functors as 1-morphisms. This is the doctrine of multi-sorted algebraic theories. If one only wanted 1-sorted algebraic theories, one would restrict the objects to only those categories that are generated under products by a single object.

Doctrines were invented by J. M. Beck.

See also

References

  • Generalised algebraic models, by Claudia Centazzo.

Wikimedia Foundation. 2010.

Игры ⚽ Нужен реферат?

Look at other dictionaries:

  • Category management — is a retailing concept in which the total range of products sold by a retailer is broken down into discrete groups of similar or related products; these groups are known as product categories. Examples of grocery categories may be : tinned fish,… …   Wikipedia

  • Category utility — is a measure of category goodness defined in Harvtxt|Gluck|Corter|1985 and Harvtxt|Corter|Gluck|1992. It was intended to supersede more limited measures of category goodness such as cue validity (Harvnb|Reed|1972;Harvnb|Rosch|Mervis|1975) and… …   Wikipedia

  • Category — may refer to: *Category (philosophy) *taxonomic category Taxonomic rank *Category (grammar) *Category (mathematics) * Categories (Aristotle) *Category (Kant) *Categories (Stoic) *Categories (game), a game involving naming categories of things… …   Wikipedia

  • Category 6 cable — Category 6 cable, commonly referred to as Cat 6, is a cable standard for Gigabit Ethernet and other network protocols that is backward compatible with the Category 5/5e and Category 3 cable standards. Cat 6 features more stringent specifications… …   Wikipedia

  • Category 5 — may refer to: * Category 5 (album), an album from rock band, FireHouse *Category 5 cable, used for carrying data *Category 5 computer virus, as classified by Symantec Corporation *Category 5 Records, a record label *Category 5 Tropical Cyclone,… …   Wikipedia

  • Category — • The term was transferred by Aristotle from its forensic meaning (procedure in legal accusation) to its logical use as attribution of a subject Catholic Encyclopedia. Kevin Knight. 2006. Category     Category …   Catholic encyclopedia

  • Category 5 cable — Category 5 cable, commonly known as Cat 5, is a twisted pair cable type designed for high signal integrity. Many such cables are unshielded but some are shielded. Category 5 has been superseded by the Category 5e specification. This type of cable …   Wikipedia

  • Category 3 cable — Category 3 cable, commonly known as Cat 3, is an unshielded twisted pair (UTP) cable designed to reliably carry data up to 10 Mbit/s, with a possible bandwidth of 16 MHz. It is part of a family of copper cabling standards defined jointly by the… …   Wikipedia

  • Category 3 — can refer to: *Category 3 cable, a specification for data cabling *British firework classification *Category 3 Tropical Cyclone on the Saffir Simpson Hurricane Scale. *Category 3 Pandemic on the Pandemic Severity Index *Category III, a rating in… …   Wikipedia

  • Category 4 — can refer to:*Category 4 Tropical Cyclone on the Saffir Simpson Hurricane Scale. *Category 4 Pandemic on the Pandemic Severity Index *Category 4 cable *The upper category for professional fireworks in England …   Wikipedia

  • category killer — cat‧e‧go‧ry kil‧ler [ˈkætgri ˌkɪlə ǁ gɔːri ˌkɪlər] noun [countable] MARKETING a very big specialized international chain store that causes local competitors to go out of business: • Category killers focus on one area of product, offering wider… …   Financial and business terms

Share the article and excerpts

Direct link
Do a right-click on the link above
and select “Copy Link”