Seminar series
Date
Wed, 26 Sep 2012
Time
10:45 -
11:45
Location
L1
Speaker
Adrian Iovita
Organisation
McGill and Padova
Given a $p$-adic weight and a finite slope we describe a Hecke and Galois equivariant geometric map relating elliptic overconvergent modular symbols and overconvergent modular forms of that slope, appropriate weights and $\mathbf{C}_p$-coefficients. We show that for a fixed slope, with the possible exception of a discrete family of weights, this map is an isomorphism.