Power series expansions of modular forms and p-adic interpolation of the square roots of Rankin-Selberg special values

Abstract

Let f be a newform of even weight 2 for D×, where D is a possibly split indefinite quaternion algebra over Q. Let K be a quadratic imaginary field splitting D and p an odd prime split in K. We extend our theory of p-adic measures attached to the power series expansions of f around the Galois orbit of the CM point corresponding to an embedding K D to forms with any nebentypus and to p dividing the level of f. For the latter we restrict our considerations to CM points corresponding to test objects endowed with an arithmetic p-level structure. Also, we restrict these p-adic measures to Zp× and compute the corresponding Euler factor in the formula for the p-adic interpolation of the "square roots" of the Rankin-Selberg special values L(πKr,12) where πK is the base change to K of the automorphic representation of GL2 associated, up to Jacquet-Langland correspondence, to f and r is a compatible family of gr\"ossencharacters of K with infinite type r,∞(z)=(z/ z)+r.