Generalised Kato classes on CM elliptic curves of rank 2

Abstract

Let E/Q be a CM elliptic curve and let p≥ 5 be a prime of good ordinary reduction for E. Suppose that L(E,s) vanishes at s=1 and has sign +1 in its functional equation, so in particular ords=1L(E,s)≥ 2. In this paper we slightly modify a construction of Darmon--Rotger to define a generalised Kato class p∈ Sel(Q,VpE), and prove the following rank two analogue of Kolyvagin's result: \[ p≠ 0 dimQp Sel(Q,VpE)=2. \] Conversely, when dimQp Sel(Q,VpE)=2 we show that p≠ 0 if and only if the restriction map \[ Sel(Q,VpE)→ E(Qp)Qp \] is nonzero. The proof of these results, which extend and strenghten similar results of the author with Hsieh in the non-CM case, exploit a new link between the nonvanishing of generalised Kato classes and a main conjecture in anticyclotomic Iwasawa theory.