On Nekov\'ar's heights, exceptional zeros and a conjecture of Mazur-Tate-Teitelbaum

Abstract

Let E/Q be an elliptic curve which has split multiplicative reduction at a prime p and whose analytic rank ran(E) equals one. The main goal of this article is to relate the second order derivative of the Mazur-Tate-Teitelbaum p-adic L-function Lp(E,s) of E to Nekov\'ar's height pairing evaluated on natural elements arising from the Beilinson-Kato elements. Along the way, we extend a Rubin-style formula of Nekov\'ar (or in an alternative wording, correct another Rubin-style formula of his) to apply in the presence of exceptional zeros. Our height formula allows us, among other things, to compare the order of vanishing of Lp(E,s) at s=1 to its (complex) analytic rank ran(E) assuming the non-triviality of the height pairing. This has consequences towards a conjecture of Mazur, Tate and Teitelbaum.