A condensed proof of the pro-étale exodromy theorem yields a new étale exodromy theorem for Postnikov-complete sheaves and a new proof of the constructible étale exodromy, removing qcqs assumptions and extending to general ∞-categories and κ-condensed statements.
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Establishes gluing formula for recollements in infinity-categories and proves equivalence between P-stratified infinity-topoi and toposic locally cocartesian fibrations over P^op.
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A condensed proof of the pro-\'etale and \'etale exodromy theorems
A condensed proof of the pro-étale exodromy theorem yields a new étale exodromy theorem for Postnikov-complete sheaves and a new proof of the constructible étale exodromy, removing qcqs assumptions and extending to general ∞-categories and κ-condensed statements.
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Recollements and stratification
Establishes gluing formula for recollements in infinity-categories and proves equivalence between P-stratified infinity-topoi and toposic locally cocartesian fibrations over P^op.