ω-equifibrations between strict and weak ω-categories

Abstract

We study ω-equifibrations between weak ω-categories in the sense of Batanin--Leinster. We define ω-equifibrations as a natural weak ω-categorical analogue of isofibrations between categories, and show that they can be characterised via the right lifting property with respect to a suitable set J of strict ω-functors. The definition of J involves the construction of a certain weak ω-category E1 which, roughly speaking, is freely generated by an equivalence 1-cell in a ``coherent'' manner. We show that the strict version of E1 coincides with Ozornova and Rovelli's coherent walking ω-equivalence ωE. The ω-equifibrations between strict ω-categories coincide with the fibrations in the folk model structure.

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