On periods of Elliptic curves
Abstract
Let E be an elliptic curve over Q having split multiplicative reduction at a prime number p. We describe the tame part of the L-invariant of E at p in terms of automorphic p-adic periods introduced in the work of Darmon. More precisely, we prove an equality of refined L-invariants using twisted versions of refined exceptional zero conjectures. When the conductor of the elliptic curve is exactly p and the automorphic period is attached to an optimal embedding of conductor 1 then we prove this equality unconditionally by using the work of de-Shalit.
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