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Ramanujan systems of Rankin-Cohen type and hyperbolic triangles

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Nikdelan,  Younes       
Max Planck Institute for Mathematics, Max Planck Society;

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Citation

Bogo, G., & Nikdelan, Y. (2023). Ramanujan systems of Rankin-Cohen type and hyperbolic triangles. Forum Mathematicum, 35(6), 1609-1629. doi:10.1515/forum-2022-0378.


Cite as: https://hdl.handle.net/21.11116/0000-000E-1363-D
Abstract
In the first part of the paper we characterize certain systems of first order nonlinear differential equations whose space of solutions is an $\mathfrak{sl}_2(\mathbb{C})$-module. We prove that such systems, called Ramanujan systems of Rankin-Cohen type, have a special shape and are precisely the ones whose solution space admits a Rankin-Cohen structure. In the second part of the paper we consider triangle groups $\Delta(n,m,\infty)$. By means of modular embeddings, we associate to every such group a number of systems of non linear ODEs whose solutions are algebraically independent twisted modular forms. In particular, all rational weight modular forms on $\Delta(n,m,\infty)$ are generated by the solutions of one such system (which is of Rankin-Cohen type). As a corollary we find new relations for the Gauss hypergeometric function evaluated at functions on the upper half-plane. To demonstrate the power of our approach in the non classical setting, we construct the space of integral weight twisted modular form on $\Delta(2,5,\infty)$ from solutions of
systems of nonlinear ODEs.