On the maximality of the λ-invariants of Mazur--Tate elements
Abstract
Let E be an elliptic curve with good ordinary reduction at an odd prime p. Assuming that Greenberg's μ=0 conjecture holds, we show that the λ-invariants of the Mazur--Tate elements attached to E either stabilise to the λ-invariant of the p-adic L-function or they attain the largest possible value at all finite levels. We characterise the latter phenomenon:\ it occurs if and only if p(L(E',1)E') is negative for some E' that is isogenous to E. Furthermore, we relate this condition to congruences with boundary symbols coming from Eisenstein series. We also study the extension of these results to Hecke eigenforms of weight two.
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