A semi-strictly generated closed structure on Gray-Cat

Abstract

We show that the semi-strictly generated internal homs of Gray-categories [A, B]ssg defined in Miranda strictifying operational coherences 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 Miranda strictifying operational coherences while overcoming the challenges posed by failure of middle four interchange to hold in Gray-categories Bourke Gurski Cocategorical Obstructions to a Tensor Product of Gray Categories. As a result we obtain a closed structure that is only partially monoidal with respect to crans tensor of gray categories. As a corollary we obtain a slight strengthening of strictification results for braided monoidal bicategories Gurski Loop Spaces, which will be improved further in a forthcoming paper Miranda weak interchange 4-categories.

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