Zeta elements for elliptic curves and applications

Abstract

Let E be an elliptic curve defined over Q with conductor N and p 2N a prime. Let L be an imaginary quadratic field with p split. We prove the existence of p-adic zeta element for E over L, encoding two different p-adic L-functions associated to E over L via explicit reciprocity laws at the primes above p. We formulate a main conjecture for E over L in terms of the zeta element, mediating different main conjectures in which the p-adic L-functions appear, and prove some results toward them. The zeta element has various applications to the arithmetic of elliptic curves. This includes a proof of main conjecture for semistable elliptic curves E over Q at supersingular primes p, as conjectured by Kobayashi in 2002. It leads to the p-part of the conjectural Birch and Swinnerton-Dyer (BSD) formula for such curves of analytic rank zero or one, and enables us to present the first infinite families of non-CM elliptic curves for which the BSD conjecture is true. We provide further evidence towards the BSD conjecture: new cases of p-converse to the Gross--Zagier and Kolyvagin theorem, and p-part of the BSD formula for ordinary primes p. Along the way, we give a proof of a conjecture of Perrin-Riou connecting Beilinson--Kato elements with rational points.