Results 101 to 110 of about 11,043 (164)
Light structuring via nonlinear total angular momentum addition with flat optics. [PDF]
Light Sci ApplMenshikov E +9 more
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Robust high-capacity free-space optical communication using OAM-based structured light and intelligent adaptive signal processing. [PDF]
Sci RepAhmad M +5 more
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Analytical study of mode filtering in a duct with resistive layers. [PDF]
PLoS OneAlahmadi H, Afzal M, Javeed U, Nawaz T.
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Interactions of a Forced Vibrating Membrane with a Cylindrical Acoustic Cavity. [PDF]
Sensors (Basel)Gascón-Pérez M.
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A Novel Multi-Slope Chirp Modulation and Demodulation with Instantaneous Chirp Rate Estimation. [PDF]
Sensors (Basel)Magkeethum A, Saechia S, Wardkein P.
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Second-order diffraction effects in practical radiometry: analytical asymptotic results. [PDF]
J Opt Soc Am A Opt Image Sci VisShirley EL.
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Sampling bessel functions and bessel sampling
2013 IEEE 8th International Symposium on Applied Computational Intelligence and Informatics (SACI), 2013The main aim of this article is to establish summation formulae in form of sampling expansion series for Bessel functions , and , and obtain sharp truncation error upper bounds occurring in the –Bessel sampling series approximation. The principal derivation tools are the famous sampling theorem by Kramer and various properties of Bessel and modified ...
Dragana Jankov Masirevic +3 more
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Applicable Algebra in Engineering, Communication and Computing, 1992
The authors present a linear combination of two integrals for calculating the integral \[ \int^ \infty_ 0xe^{-\eta x^ 2}J_ b(Kx)Y_ b(kx)dx \] where \(\eta\), \(K\), \(k\) and \(b\) are all positive real numbers. Bessel functions and Shkarofsky functions are used for this transformation.
Ross C. McPhedran +2 more
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The authors present a linear combination of two integrals for calculating the integral \[ \int^ \infty_ 0xe^{-\eta x^ 2}J_ b(Kx)Y_ b(kx)dx \] where \(\eta\), \(K\), \(k\) and \(b\) are all positive real numbers. Bessel functions and Shkarofsky functions are used for this transformation.
Ross C. McPhedran +2 more
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Journal of Mathematical Physics, 2003
A formula for the Taylor series expansion of the rth power of the modified Bessel function [Iν(z)]r is derived for arbitrary r. The result is expressed in terms of a recursive formula for a class of polynomials, which facilitates the systematic construction of the expansion of [Iν(z)]r.
Bender, Carl M. +2 more
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A formula for the Taylor series expansion of the rth power of the modified Bessel function [Iν(z)]r is derived for arbitrary r. The result is expressed in terms of a recursive formula for a class of polynomials, which facilitates the systematic construction of the expansion of [Iν(z)]r.
Bender, Carl M. +2 more
openaire +2 more sources