Two- & Three-character solutions to MLDEs and Ramanujan-Eisenstein Identities for Fricke Groups

Abstract

In this work we extend the study of arXiv:2210.07186 by investigating two- and three-character MLDEs for Fricke groups at prime levels. We have constructed these higher-character MLDEs by using a novel Serre-Ramanujan type derivative operator which maps k-forms to (k+2)-forms in +0(p). We found that this novel derivative construction enabled us to write down a general prescription for obtaining Ramanujan-Eisenstein identities for these groups. We discovered several novel single-, two-, and three-character admissible solutions for Fricke groups at levels 2 and 3 after solving the MLDEs among which we have realized some in terms of Mckay-Thompson series and others in terms of modular forms of the corresponding Hecke groups. Among these solutions, we have identified interesting non-trivial bilinear identities. Furthermore, we could construct putative partition functions for these theories based on these bilinear pairings, which could have a range of lattice interpretations. We also present and discuss modular re-parameterization of MLDE and their solutions for Fricke groups of prime levels.

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