Add to ORKGFollowing Rankin's method, D. Zagier computed the $n$-th Rankin-Cohen bracket of a modular form $g$ of weight $k_1$ with the Eisenstein series of weight $k_2$ and then computed the inner product of this Rankin-Cohen bracket with a cusp form $f$ of weight $k = k_1+k_2+2n$ and showed that this inner product gives, upto a constant, the special value of the Rankin-Selberg convolution of $f$ and $g$. This result was generalized to Jacobi forms of degree 1 by Y. Choie and W. Kohnen. In this paper, we generalize this result to Jacobi forms defined over ${\mathcal H} \times {\mathbb C}^{(g, 1)}$. doi:10.1017/S144678870900033
Abstract. We determine an explicit formula for a Rankin-Cohen bracket for Siegel modular forms of de...
Let n> 1 and let F and G be Siegel modular forms of degree n and integral weight k. For any posit...
Far any non-negative integer nu we construct esplicitly [nu/2] + 1 independent covariant bilinear di...
Following Rankin's method, D. Zagier computed the $n$-th Rankin-Cohen bracket of a modular form $g$ ...
Following Rankin's method, D. Zagier computed the $n$-th Rankin-Cohen bracket of a modular form $g$ ...
Following Rankin's method, D. Zagier computed the $n$-th Rankin-Cohen bracket of a modular form $g$ ...
Following Rankin's method, D. Zagier computed the $n$-th Rankin-Cohen bracket of a modular form $g$ ...
We construct certain Jacobi cusp forms of several variables by computing the adjoint of linear map c...
In this article we study a Rankin-Selberg convolution of two complex variables attached to Siegel mo...
In this article we study a Rankin-Selberg convolution of n complex variables for pairs of degree n S...
In this thesis, we define differential operators for Hermitian Jacobi forms and Hermitian modular fo...
The author gives a detailed introduction into the classical theory of modular forms. In particular E...
We define a twisted two complex variables Rankin-Selberg convolution of Siegel cusp forms of degree ...
Let h be a cuspidal Hecke eigenform of half-integral weight, and En/2+1/2 be Cohen’s Eisenstein seri...
In [K-S] Kohnen and Skoruppa introduced and studied a new type of Dirichlet series, which is associa...
Abstract. We determine an explicit formula for a Rankin-Cohen bracket for Siegel modular forms of de...
Let n> 1 and let F and G be Siegel modular forms of degree n and integral weight k. For any posit...
Far any non-negative integer nu we construct esplicitly [nu/2] + 1 independent covariant bilinear di...
Following Rankin's method, D. Zagier computed the $n$-th Rankin-Cohen bracket of a modular form $g$ ...
Following Rankin's method, D. Zagier computed the $n$-th Rankin-Cohen bracket of a modular form $g$ ...
Following Rankin's method, D. Zagier computed the $n$-th Rankin-Cohen bracket of a modular form $g$ ...
Following Rankin's method, D. Zagier computed the $n$-th Rankin-Cohen bracket of a modular form $g$ ...
We construct certain Jacobi cusp forms of several variables by computing the adjoint of linear map c...
In this article we study a Rankin-Selberg convolution of two complex variables attached to Siegel mo...
In this article we study a Rankin-Selberg convolution of n complex variables for pairs of degree n S...
In this thesis, we define differential operators for Hermitian Jacobi forms and Hermitian modular fo...
The author gives a detailed introduction into the classical theory of modular forms. In particular E...
We define a twisted two complex variables Rankin-Selberg convolution of Siegel cusp forms of degree ...
Let h be a cuspidal Hecke eigenform of half-integral weight, and En/2+1/2 be Cohen’s Eisenstein seri...
In [K-S] Kohnen and Skoruppa introduced and studied a new type of Dirichlet series, which is associa...
Abstract. We determine an explicit formula for a Rankin-Cohen bracket for Siegel modular forms of de...
Let n> 1 and let F and G be Siegel modular forms of degree n and integral weight k. For any posit...
Far any non-negative integer nu we construct esplicitly [nu/2] + 1 independent covariant bilinear di...