Exodromy

Abstract

Let X be a quasicompact quasiseparated scheme. Write Gal(X) for the category whose objects are geometric points of X and whose morphisms are specializations in the \'etale topology. We define a natural profinite topology on the category Gal(X) that globalizes the topologies of the absolute Galois groups of the residue fields of the points of X. One of the main results of this book is that Gal(X) variant of MacPherson's exit-path category suitable for the \'etale topology: we construct an equivalence between representations of Gal(X) and constructible sheaves on X. We show that this 'exodromy equivalence' holds with nonabelian coefficients and with finite abelian coefficients. More generally, by using the pyknotic/condensed formalism, we extend this equivalence to coefficients in the category of modules over profinite rings and algebraic extensions of Q. As an 'exit-path category', the topological category Gal(X) also gives rise to a new, concrete description of the \'etale homotopy type of X. We also prove a higher categorical form of Hochster Duality, which reconstructs the entire \'etale topos of a quasicompact and quasiseparated scheme from the topological category Gal(X). Appealing to Voevodsky's proof of a conjecture of Grothendieck, we prove the following reconstruction theorem for normal varieties over a finitely generated field k of characteristic 0: the functor XGal(X) from normal k -varieties to topological categories with an action of Gk and equivariant functors that preserve minimal objects is fully faithful.