A Fourier-Jacobi Dirichlet series attached to modular forms of SO(2,4)
Abstract
We consider a Dirichlet series D(F,G;s) attached to two automorphic forms F and G of an orthogonal group of real signature (2,4), involving their Fourier--Jacobi coefficients. When F is a Hecke eigenform and G a lift of a Jacobi-Poincar\'e series, our main result gives that D(F,G;s) is equal to the standard L-function attached to F, up to an explicit constant. To establish this, we use a correspondence between binary Hermitian forms and ideals of quaternion algebras, as established by Latimer, together with the fact that the even Clifford algebra of a three-dimensional definite quadratic space can be identified with a quaternion division algebra. Our work should be seen as a generalisation of a work of Kohnen and Skoruppa, whose result corresponds to the case of the orthogonal group of real signature (2,3).
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