A copy of this work was available on the public web and has been preserved in the Wayback Machine. The capture dates from 2020; you can also visit the original URL.
The file type is application/pdf
.
Indivisibility of Heegner cycles over Shimura curves and Selmer groups
[article]
2020
arXiv
pre-print
In this article, we show that the Abel-Jacobi images of the Heegner cycles over the Shimura curves constructed by Nekovar, Besser and the theta elements contructed by Chida-Hsieh form a bipartite Euler system in the sense of Howard. As an application of this, we deduce a converse to Gross-Zagier-Kolyvagin type theorem for higher weight modular forms generalizing works of Wei Zhang and Skinner for modular forms of weight two. That is, we show that if the rank of certain residual Selmer group is
arXiv:2006.11640v1
fatcat:rlyhxuhwjzdm7a3inydzepv7du