A semi-ordinary p-stabilization of Siegel Eisenstein series for symplectic groups and its p-adic interpolation (updated on 2023/02/23)

Abstract

For any rational prime p, we define a certain p-stabilization of holomorphic Siegel Eisenstein series for the symplectic group Sp(2n)/Q of an arbitrary genus n 1. In addition, we derive an explicit formula for the Fourier coefficients and conclude their p-adic interpolation problems. Consequently, for any odd prime p, we deduce the existence of a -adic form (in the sense of A. Wiles, H. Hida and R.L. Taylor) such that after taking a suitable constant multiple, it interpolates p-adic analytic families of the above-mentioned p-stabilized Siegel Eisenstein series with nebentypus characters locally trivial at p and Siegel Eisenstein series with nebentypus characters locally non-trivial at p simultaneously. This can be viewed as a quite natural generalization of the ordinary -adic Eisenstein series for GL(2)/Q.