On Maeda's Conjecture

Speaker:

Paloma Bengoechea

Affiliation:

ETH Zürich

Date:

Thu, 06/09/2018 - 14:05 - 14:50

Location:

MPIM Lecture Hall [2]

Parent event:

Conference on "Elementare und Analytische Zahlentheorie (ELAZ)", September 3 - 7, 2018 [3]

In 1997 Maeda established a conjecture in his work with Hida
that has been popularized in the following form:
the characteristic polynomials of the Hecke operators acting on the
space of cusp forms of fixed weight for SL(2,Z) are all irreducible and
have full Galois group. Beyond Maeda-Hida's work, this conjecture, if
true, would have different consequences; for example for the
non-vanishing of L-functions or the inverse Galois problem. We will
explain the significance of the conjecture and discuss some recent
progress.