The Norm Functor over Schemes
Abstract
We construct a globalization of Ferrand's norm functor over rings which generalizes it to the setting of a finite locally free morphism of schemes of constant rank. It sends quasi-coherent modules over to quasi-coherent modules over . These functors restrict to the category of quasi-coherent algebras. We also assemble these functors into a norm morphism from the stack of quasi-coherent modules over a finite locally free of constant rank extension of the base scheme into the stack of quasi-coherent modules. This morphism also restricts to the analogous stacks of algebras. Restricting our attention to finite \'etale covers, we give a cohomological description of the norm morphism in terms of the Segre embedding. Using this cohomological description, we show that the norm gives an equivalence of stacks of algebras , akin to the result shown in The Book of Involutions.
Cite
@article{arxiv.2401.15051,
title = {The Norm Functor over Schemes},
author = {Philippe Gille and Erhard Neher and Cameron Ruether},
journal= {arXiv preprint arXiv:2401.15051},
year = {2024}
}
Comments
127 pages. We have added a discussion of the Rost norm in sections 2.9 through 2.22. Additionally, we have made changes based on referee comments from the Mem. Eur. Math. Soc. Most notably, we have added discussion of the Clifford morphism in section 5.15