Affine \'{e}tale group schemes over Tambara fields
Abstract
We classify finite \'{e}tale extensions and finite affine \'{e}tale group schemes over the -Tambara functor , for any algebraically closed field and any finite group. This establishes -Galois descent from the Tambara functor algebraic closure of . In particular, we find new families of \'{e}tale extensions of any -Tambara functor and show that, together with one of the families discovered by Lindenstrauss--Richter--Zou, these give all finite \'{e}tale extensions of . Our arguments also show that the map associated to any -Galois extension of is \'{e}tale, generalizing a result of Lindenstrauss--Richter--Zou when is cyclic. Lastly, we classify flat finitely generated -modules when .
Keywords
Cite
@article{arxiv.2508.09365,
title = {Affine \'{e}tale group schemes over Tambara fields},
author = {Noah Wisdom},
journal= {arXiv preprint arXiv:2508.09365},
year = {2025}
}
Comments
18 pages, comments welcome! V2 comments: slightly strengthened some results