1992
DOI: 10.1364/josaa.9.000781
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Assessing the contributions of surface waves and complex rays to far-field Mie scattering by use of the Debye series

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Cited by 160 publications
(63 citation statements)
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“…2(b) of Ref. [49] for scattering by a sphere. The small difference between the spheroid and sphere cases is likely due to the fact that for scattering by a sphere each ray path is confined to a single plane.…”
Section: Numerical Verificationmentioning
confidence: 99%
See 1 more Smart Citation
“…2(b) of Ref. [49] for scattering by a sphere. The small difference between the spheroid and sphere cases is likely due to the fact that for scattering by a sphere each ray path is confined to a single plane.…”
Section: Numerical Verificationmentioning
confidence: 99%
“…2(b)of Ref. [49] is then due only to rays incident in the horizontal plane. But the plane of incidence of a given ray for scattering by a spheroid changes at each interaction of the ray with the spheroid surface.…”
Section: Numerical Verificationmentioning
confidence: 99%
“…24,25 An incoming partial wave l is in part diffracted by the sphere (½), it is in part externally reflected from the sphere surface ͑ϪR l external ͞2͒, and it is in part transmitted through the sphere…”
Section: A Beam Amplitudesmentioning
confidence: 99%
“…Another approach, not Lorentz-Mie-Debye formulation based, but the so-called Debye series [46] based, has been proposed to study the behaviors of time-domain scattering from spheres [47,48]. As in its frequency domain counterparts [46,49], each term in the Mie series is represented by another set of Debye series.…”
Section: Introductionmentioning
confidence: 99%
“…As in its frequency domain counterparts [46,49], each term in the Mie series is represented by another set of Debye series. After exchange of the summations and introducing some large argument approximations for spherical Bessel functions, the scattering field could be written as a simple form of Debye series, which could be transformed into time-domain using inverse Fourier transform.…”
Section: Introductionmentioning
confidence: 99%