Difference between revisions of "Bicategory(2)"
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| − | A category | + | {{TEX|done}} |
| + | A category $\mathfrak K$ in which subcategories of epimorphisms $\mathfrak E$ and of monomorphisms $\mathfrak M$ have been distinguished such that the following conditions are met: | ||
| − | 1) all morphisms | + | 1) all morphisms $\alpha$ in $\mathfrak K$ are decomposable into a product $\alpha=\nu\mu$, where $\nu\in\mathfrak E$, $\mu\in\mathfrak M$; |
| − | 2) if | + | 2) if $\nu\mu=\rho\tau$, where $\nu,\rho\in\mathfrak E$, $\mu,\tau\in\mathfrak M$, then there exists an isomorphism $\theta$ such that $\rho=\nu\theta$, and $\tau=\theta^{-1}\mu$; |
| − | 3) | + | 3) $\mathfrak E\cap\mathfrak M$ coincides with the class of isomorphisms in the category $\mathfrak R$. |
| − | The epimorphisms in | + | The epimorphisms in $\mathfrak E$ (the monomorphisms in $\mathfrak M$) are called the permissible epimorphisms (monomorphisms) of the bicategory. |
The concept of a bicategory axiomatizes the possibility of a decomposition of an arbitrary mapping into a product of a surjective and an injective mapping. The category of sets, the category of sets with a marked point and the category of groups are bicategories with a unique bicategorical structure. In the category of all topological spaces and in the category of all associative rings there are proper classes of different bicategorical structures. | The concept of a bicategory axiomatizes the possibility of a decomposition of an arbitrary mapping into a product of a surjective and an injective mapping. The category of sets, the category of sets with a marked point and the category of groups are bicategories with a unique bicategorical structure. In the category of all topological spaces and in the category of all associative rings there are proper classes of different bicategorical structures. | ||
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====Comments==== | ====Comments==== | ||
| − | In the literature there has been much confusion about the terms bicategory and | + | In the literature there has been much confusion about the terms bicategory and $2$-category. Usually, bicategory is understood to mean "generalized 2-category", and a bicategory as defined above is called, e.g., "bicategory in the sense of Isbell". |
In this Encyclopaedia the term bicategory is always used as defined above. | In this Encyclopaedia the term bicategory is always used as defined above. | ||
Latest revision as of 10:09, 23 August 2014
A category $\mathfrak K$ in which subcategories of epimorphisms $\mathfrak E$ and of monomorphisms $\mathfrak M$ have been distinguished such that the following conditions are met:
1) all morphisms $\alpha$ in $\mathfrak K$ are decomposable into a product $\alpha=\nu\mu$, where $\nu\in\mathfrak E$, $\mu\in\mathfrak M$;
2) if $\nu\mu=\rho\tau$, where $\nu,\rho\in\mathfrak E$, $\mu,\tau\in\mathfrak M$, then there exists an isomorphism $\theta$ such that $\rho=\nu\theta$, and $\tau=\theta^{-1}\mu$;
3) $\mathfrak E\cap\mathfrak M$ coincides with the class of isomorphisms in the category $\mathfrak R$.
The epimorphisms in $\mathfrak E$ (the monomorphisms in $\mathfrak M$) are called the permissible epimorphisms (monomorphisms) of the bicategory.
The concept of a bicategory axiomatizes the possibility of a decomposition of an arbitrary mapping into a product of a surjective and an injective mapping. The category of sets, the category of sets with a marked point and the category of groups are bicategories with a unique bicategorical structure. In the category of all topological spaces and in the category of all associative rings there are proper classes of different bicategorical structures.
References
| [1] | M.Sh. Tsalenko, E.G. Shul'geifer, "Fundamentals of category theory" , Moscow (1974) (In Russian) |
Comments
In the literature there has been much confusion about the terms bicategory and $2$-category. Usually, bicategory is understood to mean "generalized 2-category", and a bicategory as defined above is called, e.g., "bicategory in the sense of Isbell".
In this Encyclopaedia the term bicategory is always used as defined above.
Bicategory(2). Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Bicategory(2)&oldid=11447