On the structure of the Bloch--Kato Selmer groups of modular forms over anticyclotomic Zp-towers

Abstract

Let p be an odd prime number and let K be an imaginary quadratic field in which p is split. Let f be a modular form with good reduction at p. We study the variation of the Bloch--Kato Selmer groups and the Bloch--Kato--Shafarevich--Tate groups of f over the anticyclotomic Zp-extension K∞ of K. In particular, we show that under the generalized Heegner hypothesis, if the p-localization of the generalized Heegner cycle attached to f is primitive and certain local conditions hold, then the Pontryagin dual of the Selmer group of f over K∞ is free over the Iwasawa algebra. Consequently, the Bloch--Kato--Shafarevich--Tate groups of f vanish. This generalizes earlier works of Matar and Matar--Nekov\'ar on elliptic curves. Furthermore, our proof applies uniformly to the ordinary and non-ordinary settings.