Derived p-adic heights and the leading coefficient of the Bertolini--Darmon--Prasanna p-adic L-function

Abstract

Let E/Q be an elliptic curve and let p be an odd prime of good reduction for E. Let K be an imaginary quadratic field satisfying the classical Heegner hypothesis and in which p splits. The goal of this paper is two-fold: (1) We formulate a p-adic BSD conjecture for the p-adic L-function Lp BDP introduced by Bertolini--Darmon--Prasanna. (2) For an algebraic analogue Fp BDP of Lp BDP, we show that the ``leading coefficient'' part of our conjecture holds, and that the ``order of vanishing'' part follows from the expected ``maximal non-degeneracy'' of an anticyclotomic p-adic height. In particular, when the Iwasawa--Greenberg Main Conjecture (Fp BDP)=(Lp BDP) is known, our results determine the leading coefficient of Lp BDP at T=0 up to a p-adic unit. Moreover, by adapting the approach of Burungale--Castella--Kim, we prove the main conjecture for supersingular primes p under mild hypotheses. In the p-ordinary case, and under some additional hypotheses, similar results were obtained by Agboola--Castella, but our method is new and completely independent from theirs, and apply to all good primes.