Recollements and stratification
Abstract
We develop various aspects of the theory of recollements of ∞-categories, including a symmetric monoidal refinement of the theory. Our main result establishes a formula for the gluing functor of a recollement on the right-lax limit of a locally cocartesian fibration determined by a sieve-cosieve decomposition of the base. As an application, we prove a reconstruction theorem for sheaves in an ∞-topos stratified over a finite poset P in the sense of Barwick-Glasman-Haine. Combining our theorem with methods from the work of Ayala-Mazel-Gee-Rozenblyum, we then prove a conjecture of Barwick-Glasman-Haine that asserts an equivalence between the ∞-category of P-stratified ∞-topoi and that of toposic locally cocartesian fibrations over Pop.
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