arXiv:1312.1232 Abstract | arXiv Analytics

arXiv:1312.1232 [math.NT]Abstract References Reviews Resources

Self-reciprocal functions, powers of the Riemann zeta function and modular-type transformations

Published 2013-12-04Version 1

The classical transformation of Jacobi's theta function admits a simple proof by producing an integral representation that yields this invariance apparent. This idea seems to have first appeared in the work of S. Ramanujan. Several examples of this idea have been produced by Koshlyakov, Ferrar, Guinand, Ramanujan and others. A unifying procedure to analyze these examples and natural generalizations is presented.

Comments: 34 pages; submitted for publication

Categories: math.NT, math-ph, math.MP

Subjects: 11M06, 33C05

Keywords: riemann zeta function, self-reciprocal functions, modular-type transformations, jacobis theta function admits, natural generalizations

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arXiv:1312.1232 [math.NT]Abstract References Reviews Resources

Self-reciprocal functions, powers of the Riemann zeta function and modular-type transformations

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arXiv:1312.1232 [math.NT]AbstractReferencesReviewsResources

Self-reciprocal functions, powers of the Riemann zeta function and modular-type transformations

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arXiv:1312.1232 [math.NT]Abstract References Reviews Resources