STNB

STNB2025( 38a edició)

Semistable abelian varieties over $\mathbb{Q}$ which have good reduction outside of $29$

Ponents

Pip Goodman

Resum

In joint work Francesco Campagna, we classify all such abelian varieties. The main difficulty in doing so is due to the existence of a simple group scheme $V$ of order $4$ which is everywhere locally reducible (but globally irreducible). This makes it hard to classify extensions of $V$ by itself. A key step in being able to do so comes from proving the failure of a type of local--global principle for finite flat group schemes.

In this talk I will give an introduction to finite flat group schemes and outline a proof of the above.

Fitxers

No hi ha fitxers per descarregar