Seminar | December 9 | 3:10-5 p.m. | 740 Evans Hall
Preston Wake, IAS
As was made famous by Mazur, the mod-5 Galois representation associated to the elliptic curve $X_0(11)$ is reducible. Less famously, but also noted by Mazur, the mod-25 Galois representation is reducible. We’ll talk about this kind of extra reducibility phenomenon more generally, for cuspforms of even weight k and prime level. We'll observe that the characters appearing in the reducible representation are related, on one hand, to an algebraic invariant (the ‘tame deriviative’ of an L-function), and, on the other hand, to an algebraic invariant (the 'tame L-invariant'). This type of 'algebraic=analytic' relation is predicted by a version of the Bloch-Kato conjecture for families of motives formulated by Kato.