arXiv:1810.03093 Abstract | arXiv Analytics

arXiv:1810.03093 [math.CA]Abstract References Reviews Resources

The generalized modified Bessel function $K_{z,w}(x)$ at $z=1/2$ and Humbert functions

Published 2018-10-07Version 1

Recently Dixit, Kesarwani, and Moll introduced a generalization $K_{z,w}(x)$ of the modified Bessel function $K_{z}(x)$ and showed that it satisfies an elegant theory similar to $K_{z}(x)$. In this paper, we show that while $K_{\frac{1}{2}}(x)$ is an elementary function, $K_{\frac{1}{2},w}(x)$ can be written in the form of an infinite series of Humbert functions. As an application of this result, we generalize the transformation formula for the logarithm of the Dedekind eta function $\eta(z)$.

Comments: 14 pages, submitted for publication

Categories: math.CA

Subjects: 33E20, 33C10

Keywords: generalized modified bessel function, humbert functions, dedekind eta function, elegant theory similar, transformation formula

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arXiv:1810.03093 [math.CA]Abstract References Reviews Resources

The generalized modified Bessel function $K_{z,w}(x)$ at $z=1/2$ and Humbert functions

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arXiv:1810.03093 [math.CA]AbstractReferencesReviewsResources

The generalized modified Bessel function $K_{z,w}(x)$ at $z=1/2$ and Humbert functions

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arXiv:1810.03093 [math.CA]Abstract References Reviews Resources