Siegel Modular Forms, L-Functions, and Satake Parameters

## Abstract In this article we study a Rankin‐Selberg convolution of __n__ complex variables for pairs of degree __n__ Siegel cusp forms. We establish its analytic continuation to ℂ^__n__^, determine its functional equations and find its singular curves. Also, we introduce and get similar results f

In this paper, the analogy of Bol's result to the several variable function case is discussed. One shows how to construct Siegel modular forms and Jacobi forms of higher degree, respectively, using Bol's result.

## Abstract Let __N__ ∈ ℕ and let __χ__ be a Dirichlet character modulo __N__. Let __f__ be a modular form with respect to the group Γ~0~(__N__), multiplier __χ__ and weight __k__. Let __F__ be the __L__ ‐function associated with __f__ and normalized in such a way that __F__ (__s__) satisfies a fun

Relations among endoscopy liftings of automorphic forms, poles of L-functions, and nonvanishing of certain periods of automorphic forms have long been expected, although they have not been formulated, even conjecturally. We take a first step toward considering the relations by formulating our conjec