Enriched pro-categories and shapes (1905.07181v1)
Abstract: Given a category $\mathcal C$ and a directed partially ordered set $J$, a certain category $proJ -\mathcal C$ on inverse systems in $\mathcal C$ is constructed such that the ordinary pro-category $pro-\mathcal C$ is the most special case of a singleton $J \equiv {1}$. Further, the known $pro*$-category $pro *-\mathcal C$ becomes $pro {\mathbb N }-\mathcal C$. Moreover, given a pro-reflective category pair $(\mathcal C, \mathcal D)$, the $J$-shape category $ShJ_{(C,\mathcal D)}$ and the corresponding $J$-shape functor $SJ$ are constructed which, in mentioned special cases, become the well known ones. Among several important properties, the continuity theorem for a J-shape category is established. It implies the "$J$-shape theory" is a genuine one such that the shape and the coarse shape theory are its very special examples.
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