Dirichlet series of Rankin-Cohen Brackets
Abstract
Given modular forms f and g of weights k and , respectively, their Rankin-Cohen bracket [f,g](k, )n corresponding to a nonnegative integer n is a modular form of weight k + +2n, and it is given as a linear combination of the products of the form f(r) g(n-r) for 0 ≤ r ≤ n. We use a correspondence between quasimodular forms and sequences of modular forms to express the Dirichlet series of a product of derivatives of modular forms as a linear combination of the Dirichlet series of Rankin-Cohen brackets.
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