Non-vanishing of the p-adic constant for mock modular forms associated to a newform with real Fourier coefficients

Abstract

Let F+ be a mock modular form associated to a normalized newform g. K. Bringmann et. al. obtained a p-adic modular form starting from F+ by adding a suitable linear combination of Eichler integrals of g(q) and g(qp). We denote the coefficients of the Eichler integrals of g(q) and g(qp) by γg and δg. These constants are important in the p-adic theory of mock modular forms, but relatively little is known about them at present. For instance, K. Bringmann et. al. raised the question of whether δg vanishes when g has CM by an imaginary quadratic field in which p is inert. In previous work, the non-vanishing of δg has been proved mainly when g is associated to an elliptic curve. In higher weight, only one example was known for which δg≠ 0. In this paper, we show that δg≠ 0 under mild assumptions when all the Fourier coefficients of g ∈ Sk(0(N), ) are real, without assuming that g has CM. In particular, this provides a class of higher-weight examples for which δg≠ 0.