A space of weight one modular forms attached to totally real cubic number fields
Abstract
Let d be a positive fundamental discriminant, and let Cd be the set of isomorphism classes of cubic number fields of discriminant d. For each K ∈ Cd, we construct a weight 1 modular form fK with level 3 1d and nebentypus ( -3 1d· ). We show that the form fK completely determines the field K. Moreover, we show that \fK : K ∈ Cd\ is a linearly independent set.
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