Eichler-Selberg relations for the third-order mock theta functions
Abstract
Ramanujan's third-order mock theta function f(q) admits the well-known Appell-Lerch series representation: \[ Σn=0∞qn2(-q;q)n2=2(q;q)∞Σn=-∞∞(-1)nq32n2+12n1+qn. \] In this paper, we establish a natural generalization of this classical identity by utilizing the theory of harmonic Maass forms. Furthermore, we prove analogous Eichler-Selberg type relations for another third-order mock theta function ω(q). The method presented in this paper can be extended to study other classes of mock theta functions.
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