printable pdf
比利时vs摩洛哥足彩 ,
university of california san diego

****************************

rtg colloquium

werner bley

universität münchen

congruences for critical values of higher derivatives of twisted hasse-weil $l$-functions

abstract:

et $e$ be an elliptic curve defined over a number field $k$ and $f$ a finite cyclic extension of $k$ of $p$-power degree for an odd prime $p$. under certain technical hypotheses, we describe a reinterpretation of the equivariant tamagawa number conjecture (`etnc') for $e$, $f/k$ and $p$ as an explicit family of $p$-adic congruences involving values of derivatives of the hasse-weil $l$-functions of twists of $e$, normalised by completely explicit twisted regulators. this reinterpretation makes the etnc amenable to numerical verification and furthermore leads to explicit predictions which refine well-known conjectures of mazur and tate. this is a report on joint work with daniel macias castillo

host: james mckernan

november 8, 2017

1:30 pm

ap&m 2402

****************************