The derived Brauer map via twisted sheaves
Abstract
Let X be a quasicompact quasiseparated scheme. The collection of derived Azumaya algebras in the sense of To\"en forms a group, which contains the classical Brauer group of X and which we call Br(X) following Lurie. To\"en introduced a map φ:Br(X) H2et(X, Gm) which extends the classical Brauer map, but instead of being injective, it is surjective. In this paper we study the restriction of φ to a subgroup Br(X)⊂ Br(X), which we call the "derived Brauer group", on which φ becomes an isomorphism Br(X) H2et(X, Gm). This map may be interpreted as a derived version of the classical Brauer map which offers a way to "fill the gap" between the classical Brauer group and the cohomogical Brauer group. The group Br(X) was introduced by Lurie by making use of the theory of prestable ∞-categories. There, the mentioned isomorphism of abelian groups was deduced from an equivalence of ∞-categories between the "Brauer space" of invertible presentable prestable OX-linear categories, and the space Map(X,K( Gm,2)). We offer an alternative proof of this equivalence of ∞-categories, characterizing the functor from the left to the right via gerbes of connective trivializations, and its inverse via connective twisted sheaves. We also prove that this equivalence carries a symmetric monoidal structure, thus proving a conjecture of Binda an Porta.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.