Period Function of Maass forms from Ramanujan's Lost Notebook
Abstract
The Lost Notebook of Ramanujan contains a number of beautiful formulas, one of which can be found on its page 220. It involves an interesting function, which we denote as F1(x). In this paper, we show that F1(x) belongs to the category of period functions as it satisfies the period relations of Maass forms in the sense of Lewis and Zagier lz. Hence, we refer to F1(x) as the Ramanujan period function. Moreover, one of the salient aspects of the Ramanujan period function F1(x) that we found out is that it is a Hecke eigenfunction under the action of Hecke operators on the space of periods. We also establish that it naturally appears in a Kronecker limit formula of a certain zeta function, revealing its connections to various topics. Finally, we generalize F1(x) to include a parameter s, connecting our work to the broader theory of period functions developed by Bettin and Conrey bc and Lewis and Zagier lz. We emphasize that Ramanujan was the first to study this function, marking the beginning of the study of period functions.
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