Rankin-Cohen brackets for Calabi-Yau modular forms

Abstract

For any positive integer n, we introduce a quasi-homogeneous vector field D of degree 2 on a moduli space T of enhanced Calabi-Yau n-folds arising from the Dwork family. By Calabi-Yau quasi-modular forms for Dwork family we mean the elements of the graded C-algebra M generated by the components of a particular solution of D, which are provided with natural weight. Using D we introduce the derivation D and the Ramanujan-Serre type derivation ∂ on M. We show that they are degree 2 differential operators and there exists a proper subspace M⊂ M, called the space of Calabi-Yau modular forms, which is closed under ∂. Using the derivation D, we define the Rankin-Cohen brackets for Calabi-Yau quasi-modular forms and prove that the subspace generated by the positive weight elements of M is closed under the Rankin-Cohen brackets.