On Modular Forms of Characteristic p>0

## 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

Let A=F q [T ] be the polynomial ring over the finite field F q of q elements. D. Goss remarks in [13, (2.1)] that the algebra of (Drinfeld ) modular forms for GL(2, A) is the free ring generated by the two Eisenstein series of weights q&1 and q 2 &1. For a more general congruence subgroup, an abstr

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.

We develop an algorithm for determining an explicit set of coset representatives (indexed by lattices) for the action of the Hecke operators T(p), T j (p 2 ) on Siegel modular forms of fixed degree and weight. This algorithm associates each coset representative with a particular lattice W, pL ı W ı