Weakly invertible cells in a weak ω-category
Abstract
We study weakly invertible cells in weak ω-categories in the sense of Batanin-Leinster, adopting the coinductive definition of weak invertibility. We show that weakly invertible cells in a weak ω-category are closed under globular pasting. Using this, we generalise elementary properties of weakly invertible cells known to hold in strict ω-categories to weak ω-categories, and show that every weak ω-category has a largest weak ω-subgroupoid.
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