Exodromy
Abstract
Let be a quasicompact quasiseparated scheme. Write for the category whose objects are geometric points of and whose morphisms are specializations in the \'etale topology. We define a natural profinite topology on the category that globalizes the topologies of the absolute Galois groups of the residue fields of the points of . One of the main results of this book is that variant of MacPherson's exit-path category suitable for the \'etale topology: we construct an equivalence between representations of and constructible sheaves on . 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 . As an 'exit-path category', the topological category also gives rise to a new, concrete description of the \'etale homotopy type of . 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 . Appealing to Voevodsky's proof of a conjecture of Grothendieck, we prove the following reconstruction theorem for normal varieties over a finitely generated field of characteristic : the functor from normal -varieties to topological categories with an action of and equivariant functors that preserve minimal objects is fully faithful.
Cite
@article{arxiv.1807.03281,
title = {Exodromy},
author = {Clark Barwick and Saul Glasman and Peter Haine},
journal= {arXiv preprint arXiv:1807.03281},
year = {2020}
}
Comments
Comments very welcome. v7: 253 pages. Extensively edited and reorganized the whole document and expanded on a number of points. Added Chapter 13 which uses pyknotic/condensed mathematics to extend the Exodromy Theorem to a classification result for $\ell$-adic sheaves