Allal Ghanmi, Ahmed Intissar
Let \chi be a character on a discrete subgroup \Gamma of rank one of the additive group (C,+). We construct a complete orthonormal basis of the Hilbert space of (L^2,\Gamma,\chi)-theta functions. Furthermore, we show that it possesses a Hilbertian orthogonal decomposition involving the L^2-eigenspaces of the Landau operator \Delta_\nu; \nu>0, associated to the eigenvalues \nu m. For m=0, the associated L^2-eigenspace is the Hilbert subspace of entire (L^2,\Gamma,\chi)-theta functions. Corresponding orthonormal basis are constructed and the corresponding reproducing kernel can be expressed in terms of the generalized theta function of characteristic [\alpha,0].
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http://arxiv.org/abs/1212.1870
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