Recollements in stable ∞-categories

Abstract

We develop the theory of recollements in a stable ∞-categorical setting. In the axiomatization of Beilinson, Bernstein and Deligne, recollement situations provide a generalization of Grothendieck's "six functors" between derived categories. The adjointness relations between functors in a recollement D0 D D1 induce a "recoll\'ee" t-structure t0t1 on D , given t-structures t0,t1 on D0, D1. Such a classical result, well-known in the setting of triangulated categories, is recasted in the setting of stable ∞-categories and the properties of the associated (∞-categorical) factorization systems are investigated. In the geometric case of a stratified space, various recollements arise, which "interact well" with the combinatorics of the intersections of strata to give a well-defined, associative operation. From this we deduce a generalized associative property for n-fold gluing t0·s tn, valid in any stable ∞-category.