Construction of concrete orthonormal basis for (L2,,)-theta functions associated to discrete subgroups of rank one in (C,+)

Abstract

Let be a character on a discrete subgroup of rank one of the additive group (C,+). We construct a complete orthonormal basis of the Hilbert space of (L2,,)-theta functions. Furthermore, we show that it possesses a Hilbertian orthogonal decomposition involving the L2-eigenspaces of the Landau operator ; >0, associated to the eigenvalues m. For m=0, the associated L2-eigenspace is the Hilbert subspace of entire (L2,,)-theta functions. Corresponding orthonormal basis are constructed and the corresponding reproducing kernel can be expressed in terms of the generalized theta function of characteristic [α,0].