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Uniform enclosures for the phase and zeros of Bessel functions and their derivatives

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Filonov, N., Levitin, M. ORCID: https://orcid.org/0000-0003-0020-3265, Polterovich, I. and Sher, D. A. (2024) Uniform enclosures for the phase and zeros of Bessel functions and their derivatives. SIAM Journal on Mathematical Analysis (SIMA), 56 (6). pp. 7644-7682. ISSN 1095-7154

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To link to this item DOI: 10.1137/24M1642032

Abstract/Summary

We prove explicit uniform two-sided bounds for the phase functions of Bessel functions and of their derivatives. As a consequence, we obtain new enclosures for the zeros of Bessel functions and their derivatives in terms of inverse values of some elementary functions. These bounds are valid, with a few exceptions, for all zeros and all Bessel functions with non-negative indices. We provide numerical evidence showing that our bounds either improve or closely match the best previously known ones.

Item Type:Article
Refereed:Yes
Divisions:Science > School of Mathematical, Physical and Computational Sciences > Department of Mathematics and Statistics
ID Code:117826
Uncontrolled Keywords:Bessel functions, Bessel zeros, phase function, Sturm oscillation theorem, one-dimensional Schrödinger equation
Additional Information:The accompanying Mathematica script and its printout are available for download at https://michaellevitin.net/bessels.html
Publisher:Society for Industrial and Applied Mathematics
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