Restriction of Eisenstein series and Stark-Heegner points

Abstract

In a recent work of Darmon, Pozzi and Vonk, the authors consider a particular p-adic family of Hilbert Eisenstein series Ek(1,) associated with an odd character of the narrow ideal class group of a real quadratic field F and compute the first derivative of a certain one-variable twisted triple product p-adic L-series attached to Ek(1,) and an elliptic newform f of weight 2 on 0(p). In this paper, we generalize their construction to include the cyclotomic variable and thus obtain a two-variable twisted triple product p-adic L-series. Moreover, when f is associated with an elliptic curve E over , we prove that the first derivative of this p-adic L-series along the weight direction is a product of the p-adic logarithm of a Stark-Heegner point of E over F introduced by Darmon and the cyclotomic p-adic L-function for E.