p-adic L-functions for U(2,1)× U(1,1)
Abstract
We construct the five-variable p-adic L-function attached to Hida families on U(2,1)× U(1,1), interpolating the square-root of Rankin-Selberg L-values in the shifted piano range. Our construction relies on a new theta operator and its p-adic variation which plays a role analogous to the classical Ramanujan-Serre theta operator in Hida's p-adic Rankin-Selberg method. The interpolation formula, including the modified Euler factors at p and at the real place, is consistent with the conjectural shape of p-adic L-functions predicted by Coates and Perrin-Riou.
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