On Zeta Functions and Families of Siegel Modular Forms

Abstract

Let p be a prime, and let =g() be the Siegel modular group of genus g. We study p-adic families of zeta functions and Siegel modular forms. L-functions of Siegel modular forms are described in terms of motivic L-functions attached to g, and their analytic properties are given. Critical values for the spinor L-functions and p-adic constructions are discussed. Rankin's lemma of higher genus is established. A general conjecture on a lifting from GSp2m × GSp2m to GSp4m (of genus g=4m) is formulated. Constructions of p-adic families of Siegel modular forms are given using Ikeda-Miyawaki constructions.