On the weak Leopoldt conjecture and coranks of Selmer groups of supersingular abelian varieties in p-adic Lie extensions

Abstract

Let A be an abelian variety defined over a number field F with supersingular reduction at all primes of F above p. We establish an equivalence between the weak Leopoldt conjecture and the expected value of the corank of the classical Selmer group of A over a p-adic Lie extension (not neccesasily containing the cyclotomic -extension). As an application, we obtain the exactness of the defining sequence of the Selmer group. In the event that the p-adic Lie extension is one-dimensional, we show that the dual Selmer group has no nontrivial finite submodules. Finally, we show that the aforementioned conclusions carry over to the Selmer group of a non-ordinary cuspidal modular form.