On Hermitian Eisenstein series of degree 2
Abstract
We consider the Hermitian Eisenstein series E(K)k of degree 2 and weight k associated with an imaginary-quadratic number field K and determine the influence of K on the arithmetic and the growth of its Fourier coefficients. We find that they satisfy the identity E(K)24 = E(K)8, which is well-known for Siegel modular forms of degree 2, if and only if K = Q (-3). As an application, we show that the Eisenstein series E(K)k, k=4,6,8,10,12 are algebraically independent whenever K≠ Q(-3). The difference between the Siegel and the restriction of the Hermitian to the Siegel half-space is a cusp form in the Maass space that does not vanish identically for sufficiently large weight; however, when the weight is fixed, we will see that it tends to 0 as the discriminant tends to -∞. Finally, we show that these forms generate the space of cusp forms in the Maass Spezialschar as a module over the Hecke algebra as K varies over imaginary-quadratic number fields.
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