On analogues of Mazur-Tate type conjectures in the Rankin-Selberg setting

Abstract

We study the Fitting ideals over the finite layers of the cyclotomic Zp-extension of Q of Selmer groups attached to the Rankin--Selberg convolution of two modular forms f and g. Inspired by the Theta elements for modular forms defined by Mazur and Tate in ``Refined conjectures of the Birch and Swinnerton-Dyer type'', we define new Theta elements for Rankin--Selberg convolutions of f and g using Loeffler--Zerbes' geometric p-adic L-functions attached to f and g. Under certain technical hypotheses, we generalize a recent work of Kim--Kurihara on elliptic curves to prove a result very close to the weak main conjecture of Mazur and Tate for Rankin--Selberg convolutions. Special emphasis is given to the case where f corresponds to an elliptic curve E and g to a two dimensional odd irreducible Artin representation with splitting field F. As an application, we give an upper bound of the dimension of the -isotypic component of the Mordell-Weil group of E over the finite layers of the cyclotomic Zp-extension of F in terms of the order of vanishing of our Theta elements.