On the factorisation of the p-adic Rankin-Selberg L-function in the supersingular case

Abstract

Given a cusp form f which is supersingular at a fixed prime p away from the level, and a Coleman family F through one of its p-stabilisations, we construct a 2-variable meromorphic p-adic L-function for the symmetric square of F. We prove that this new p-adic L-function interpolates values of complex imprimitive symmetric square L-functions, for the various specialisations of the family F. We use this p-adic L-function to prove a p-adic factorisation formula, expressing the geometric p-adic L-function attached to the Rankin--Selberg convolution of f with itself as a the product of the p-adic symmetric square L-function of f and a Kubota-Leopoldt L-function. This extends a result of Dasgupta in the ordinary case.