*-autonomous category について

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*-autonomous category ：ウィキペディア英語版

*-autonomous category
In mathematics, a
*-autonomous (read "star-autonomous") category C is a symmetric monoidal closed category equipped with a dualizing object

\bot

.
==Definition==

Let C be a symmetric monoidal closed category. For any object ''A'' and

\bot

, there exists a morphism
:

\partial_:A\to(A\Rightarrow\bot)\Rightarrow\bot

defined as the image by the bijection defining the monoidal closure, of the morphism
:

\mathrm_\circ\gamma_ : (A\Rightarrow\bot)\otimes A\to\bot

An object

\bot

of the category C is called dualizing when the associated morphism

\partial_

is an isomorphism for every object ''A'' of the category C.
Equivalently, a
*-autonomous category is a symmetric monoidal category ''C'' together with a functor

(-)^*:C^^*

, and for every three objects ''A'', ''B'' and ''C'' there is a natural bijection
:

\mathrm(A\otimes B,C^*)\cong\mathrm(A,(B\otimes C)^*)

.
The dualizing object of ''C'' is then defined by

\bot=I^*

.

抄文引用元・出典: フリー百科事典『ウィキペディア（Wikipedia）』
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