Localizing and colocalizing subcategories on schemes

Abstract

A full triangulated subcategory L ⊂ T of triangulated category T is localizing if it is stable for coproducts. If, further, T is -triangulated, we say that H is -ideal if F G ∈ L for all G ∈ L and all F ∈ T. Analogously, a full triangulated subcategory C ⊂ T is colocalizing if it is stable for products. If, further, T is closed, i.e. -triangulated with internal homs (denoted [-,-]), we say that C is H-coideal if [F, G] ∈ C for all G ∈ C and all F ∈ T. For a point generated concentrated scheme X, we prove that all -ideal localizing subcategories of Dqc(X) are classified by the subsets of X. As a consequence, we prove that for H-coideal colocalizing subcategories of Dqc(X) the same holds. Moreover, every such colocalizing subcategory C is of the form C= L, where L is a -ideal localizing subcategory of Dqc(X).