MPIM

The Fermat equation $x^13+y^13=3z^7$MPIM

Name: The Fermat equation $x^13+y^13=3z^7$
Start: 2025-08-14T16:30:00+02:00
End: 2025-08-14T17:00:00+02:00
Location: Max Planck Institute for Mathematics

by Nuno Freitas (ICMAT, Madrid/MPIM)

Thursday Aug 14, 2025, 4:30 PM → 5:00 PM Europe/Berlin

MPIM, Vivatsgasse, 7 - Lecture Hall (Max Planck Institute for Mathematics)

MPIM, Vivatsgasse, 7 - Lecture Hall

Max Planck Institute for Mathematics

120

Description

Number theory lunch seminar

The modular method is a fantastic tool to solve families of Diophantine
equations with a varying exponent, but it often fails for small values of
the exponent. For example, the Fermat-type equation $x^13+y^13=3z^p$ has been
solved for all $p\ne 7$. In this talk, we will discuss how a combination of a
unit sieve, the modular method, level raising and computations of systems
of eigenvalues modulo $7$, and results for reducibility of certain Galois
representations, allows us to solve the missing case $p=7$.

Choose timezone

The Fermat equation $x^13+y^13=3z^7$MPIM

by Nuno Freitas (ICMAT, Madrid/MPIM)

MPIM, Vivatsgasse, 7 - Lecture Hall

Max Planck Institute for Mathematics