p-adic Heights of Heegner points on Shimura curves

Abstract

Let f be a primitive Hilbert modular form of parallel weight 2 and level N for the totally real field F, and let p be a rational prime coprime to 2N. If f is ordinary at p and E is a CM extension of F of relative discriminant prime to Np, we give an explicit construction of the p-adic Rankin-Selberg L-function Lp(fE,·). When the sign of its functional equation is -1, we show, under the assumption that all primes p are principal ideals of OF which split in OE, that its central derivative is given by the p-adic height of a Heegner point on the abelian variety A associated with f. This p-adic Gross--Zagier formula generalises the result obtained by Perrin-Riou when F= Q and (N,E) satisfies the so-called Heegner condition. We deduce applications to both the p-adic and the classical Birch and Swinnerton-Dyer conjectures for~A.