Affine \'etale group schemes over Tambara fields

Abstract

We classify finite \'etale extensions and finite affine \'etale group schemes over the G-Tambara functor F, for F any algebraically closed field and G any finite group. This establishes G-Galois descent from the Tambara functor algebraic closure of F. In particular, we find new families of \'etale extensions of any G-Tambara functor and show that, together with one of the families discovered by Lindenstrauss--Richter--Zou, these give all finite \'etale extensions of F. Our arguments also show that the map K → FP(L) associated to any G-Galois extension L of K is \'etale, generalizing a result of Lindenstrauss--Richter--Zou when G is cyclic. Lastly, we classify flat finitely generated F-modules when G = Cp.