Iwasawa theory for Rankin-Selberg convolution at an Eisenstein prime

Abstract

Let p be an odd prime, f be a p -ordinary newform of weight k and h be a normalized cuspidal p -ordinary Hecke eigenform of weight l < k. In this article, we study the p-adic L -function and p∞ -Selmer group of the Rankin-Selberg product of f and h under the assumption that p is an Eisenstein prime for h i.e. the residual Galois representation of h at p is reducible. We show that the p -adic L -function and the characteristic ideal of the p∞-Selmer group of the Rankin-Selberg product of f, h generate the same ideal modulo p in the Iwasawa algebra i.e. the Rankin-Selberg Iwasawa main conjecture for f h holds mod p. As an application to our results, we explicitly describe a few examples where the above congruence holds.