A semi-strictly generated closed structure on Gray-Cat

Pub Date : 2024-05-29 DOI:10.1016/j.jpaa.2024.107740
Adrian Miranda
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引用次数: 0

Abstract

We show that the semi-strictly generated internal homs of Gray-categories [A,B]ssg defined in [19] underlie a closed structure on the category Gray-Cat of Gray-categories and Gray-functors. The morphisms of [A,B]ssg are composites of those trinatural transformations which satisfy the unit and composition conditions for pseudonatural transformations on the nose rather than up to an invertible 3-cell. Such trinatural transformations leverage three-dimensional strictification [19] while overcoming the challenges posed by failure of middle four interchange to hold in Gray-categories [3]. As a result we obtain a closed structure that is only partially monoidal with respect to [8]. As a corollary we obtain a slight strengthening of strictification results for braided monoidal bicategories [13], which will be improved further in a forthcoming paper [21].

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灰猫上的半严格生成封闭结构
我们证明了[19]中定义的灰色范畴[A,B]sg的半严格生成的内部原子是灰色范畴和灰色函数的灰色猫范畴的封闭结构的基础。[A,B]ssg的变形是那些满足鼻子上的伪自然变换的单位条件和组成条件的三自然变换的复合体,而不是直到可逆的3单元。这种三自然变换利用了三维严格化[19],同时克服了灰色范畴[3]中中间四互换不成立所带来的挑战。因此,我们得到了一个封闭的结构,这个结构相对于[8]而言只是部分单模的。作为推论,我们得到了对辫状单环二元范畴[13]的严格化结果的轻微加强,这将在即将发表的论文[21]中得到进一步改进。
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