at the centre contributes the plane wave and that the remainder of the sphere provides a contribution which vanishes in the limit. The demonstration involves the use of the principle of stationary phase for an integral of two variables.
Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by Crossref.
Pearson, J. D.
1953.
The diffraction of electro-magnetic waves by a semi-infinite circular wave guide.
Mathematical Proceedings of the Cambridge Philosophical Society,
Vol. 49,
Issue. 4,
p.
659.
Bouwkamp, C J
1954.
Diffraction Theory.
Reports on Progress in Physics,
Vol. 17,
Issue. 1,
p.
35.
Heins, A. E.
and
Silver, S.
1955.
The edge conditions and field representation theorems in the theory of electromagnetic diffraction.
Mathematical Proceedings of the Cambridge Philosophical Society,
Vol. 51,
Issue. 1,
p.
149.
1955.
The scattering of a scalar wave by a semi-infinite rod of circular cross section.
Philosophical Transactions of the Royal Society of London. Series A, Mathematical and Physical Sciences,
Vol. 247,
Issue. 934,
p.
499.
Jones, D.S.
1955.
CIX. On the scattering gross section of an obstacle.
The London, Edinburgh, and Dublin Philosophical Magazine and Journal of Science,
Vol. 46,
Issue. 380,
p.
957.
Heins, Albert E.
and
Silver, Samuel
1958.
Comments on the treatment of diffraction of plane waves: Addendum to ‘The edge conditions and field representation theorems in the theory of electromagnetic diffraction’.
Mathematical Proceedings of the Cambridge Philosophical Society,
Vol. 54,
Issue. 1,
p.
131.
Barratt, P. J.
and
Collins, W. D.
1965.
The scattering cross-section of an obstacle in an elastic solid for plane harmonic waves.
Mathematical Proceedings of the Cambridge Philosophical Society,
Vol. 61,
Issue. 4,
p.
969.
Nieto-Vesperinas, Manuel
and
Wolf, Emil
1986.
Generalized Stokes reciprocity relations for scattering from dielectric objects of arbitrary shape.
Journal of the Optical Society of America A,
Vol. 3,
Issue. 12,
p.
2038.
Hönl, H.
Maue, A. W.
and
Westpfahl, K.
1987.
Kristalloptik · Beugung / Crystal Optics · Diffraction.
Vol. 5 / 25 / 1,
Issue. ,
p.
218.
Alonso, Miguel A.
and
Borghi, Riccardo
2006.
Complete far-field asymptotic series for free fields.
Optics Letters,
Vol. 31,
Issue. 20,
p.
3028.
Borghi, Riccardo
and
Alonso, Miguel A.
2009.
Free-space asymptotic far-field series.
Journal of the Optical Society of America A,
Vol. 26,
Issue. 11,
p.
2410.
Zhang, Likun
and
Marston, Philip L.
2012.
Axial radiation force exerted by general non-diffracting beams.
The Journal of the Acoustical Society of America,
Vol. 131,
Issue. 4,
p.
EL329.
Nieto-Vesperinas, Manuel
2015.
Optical theorem for the conservation of electromagnetic helicity: Significance for molecular energy transfer and enantiomeric discrimination by circular dichroism.
Physical Review A,
Vol. 92,
Issue. 2,
Mishchenko, Michael I.
Videen, Gorden
and
Yang, Ping
2017.
Extinction by a homogeneous spherical particle in an absorbing medium.
Optics Letters,
Vol. 42,
Issue. 23,
p.
4873.
Martin, P. A.
2018.
On in‐out splitting of incident fields and the far‐field behaviour of Herglotz wavefunctions.
Mathematical Methods in the Applied Sciences,
Vol. 41,
Issue. 8,
p.
2961.
Zhang, Likun
2019.
Generalized optical theorem for an arbitrary incident field.
The Journal of the Acoustical Society of America,
Vol. 145,
Issue. 3,
p.
EL185.
Martin, P.A.
2019.
Quadratic quantities in acoustics: Scattering cross-section and radiation force.
Wave Motion,
Vol. 86,
Issue. ,
p.
63.
Mishchenko, Michael I.
and
Yurkin, Maxim A.
2020.
Co- and counter-propagating wave effects in an absorbing medium.
Journal of Quantitative Spectroscopy and Radiative Transfer,
Vol. 242,
Issue. ,
p.
106688.
Lucido, Mario
2023.
Absorption by a Holed Resistive Plane: A New Optical Theorem Formulation.
p.
497.
Lucido, Mario
and
Nosych, Oleksandr I.
2024.
Optical theorem in the 3-D scattering from a locally perturbed lossless or lossy thin dielectric plate: silver disk-sealed hole analysis.
Optics Express,
Vol. 32,
Issue. 17,
p.
29030.