Nonvanishing of generalised Kato classes and Iwasawa main conjectures
Abstract
A construction due to Darmon--Rotger gives rise to generalised Kato classes p(E) in the p-adic Selmer group Sel(Q,VpE) of elliptic curves E/Q of positive even analytic rank, where p>3 is any prime of good ordinary reduction for E. In some cases, their conjectured that p(E)≠ 0 precisely when Sel(Q,VpE) is two-dimensional. The first cases of this conjecture were obtained in a joint work of the author with M.-L. Hsieh. In this note we give a new proof of the implication \[ p(E)≠ 0 dimQp Sel(Q,VpE)=2 \] established in op. cit., and show that the converse implication holds if and only if the restriction map locp: Sel(Q,VpE)→ E(Qp)Qp is nonzero. The present approach is an adaptation to the non-CM case of the method introduced by the author in the case of CM elliptic curves.
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