Higher geometric sheaf theories

Abstract

We introduce the notion of a higher covering diagram in a base ∞-category C. The theory of higher covering diagrams in C will be shown to recover various descent conditions known from the ∞-categorical literature in a uniform manner. In fact, higher covering diagrams always assemble to what we refer to as a structured colimit pre-topology on the base C. It hence always defines a sub-canonical sheaf theory over C, and indeed defines the canonical such whenever C has pullbacks. This ``higher geometric'' sheaf theory will be shown to differ from the usual infinitary-coherent sheaf theory by a cotopological localization whenever C is infinitary-coherent itself. We prove that this localization is generally non-trivial. For instance, every ∞-topos is the theory of higher geometric sheaves over itself, but the according infinitary-coherent sheaf theory over it is generally strictly larger. The higher geometric sheaves are hence characterized by a limit preservation property that is generally not captured by the classical sheaf condition. We define an ∞-category of higher geometric ∞-categories, and show that the (opposite of the) ∞-category of ∞-toposes embeds fully faithfully therein. We show that the higher -geometric sheaf theory on a higher -geometric ∞-category defines the free ∞-topos generated by it, and consequently that it faithfully generalizes Lurie's definition of a ``sheaf'' over an ∞-topos.

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