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Hecke eigenvalues of Klingen--Eisenstein series of squarefree level

Research paper by Martin J. Dickson

Indexed on: 30 Dec '15Published on: 30 Dec '15Published in: Mathematics - Number Theory



Abstract

We compute the intertwining relation between the Hecke operators and the Siegel lowering operators on Siegel modular forms of arbitrary level $N$ and character $\chi$ by using formulas for the action of the Hecke operators on Fourier expansions. Using an explicit description of the Satake compactification of $\Gamma_0^{(n)}(N) \backslash \mathfrak{H}_n$ when $N$ is squarefree we extend this to give intertwining relations for each cusp. As an application we give formulas for the action of Hecke operators on the space of Klingen--Eisenstein series of squarefree level $N$, for primes $p \nmid N$.