Codes for electromagnetic scattering by cylinders

Codes for electromagnetic scattering by cylinders – this article list codes for electromagnetic scattering by a cylinder.

Majority of existing codes for calculation of electromagnetic scattering by a single cylinder are based on Mie theory, which is an analytical solution of Maxwell's equations in terms of infinite series.[1]

Classification

The compilation contains information about the electromagnetic scattering by cylindrical particles, relevant links, and applications.[2]

Codes for electromagnetic scattering by a single homogeneous cylinder

YearNameAuthorsReferencesLanguageShort description
1983 BHCYL Craig F. Bohren and Donald R. Huffman [1] Fortran Mie solution (infinite series) to scattering, absorption and phase function of electromagnetic waves by a homogeneous cylinder.
1992 SCAOBLIQ2.FOR H. A. Yousif and E. Boutros [3] Fortran Cylinder, oblique incidence.
2002 Mackowski D. Mackowski Fortran Cylinder, oblique incidence.
2008 jMie2D Jeffrey M. McMahon C++ Mie solution. Open-source software.
2015 nwabsorption Sarath Ramadurgam MATLAB Computes various optical properties of a single nanowire with up to 2 shell layers using Mie-formalism.
2020 MieSolver Stuart C. Hawkins [4] MATLAB One or more cylinders with mixed properties including solid and layered cylinders.

Relevant scattering codes

See also

References

  1. Bohren, Craig F. and Donald R. Huffman, Title Absorption and scattering of light by small particles, New York : Wiley, 1998, 530 p., ISBN 0-471-29340-7, ISBN 978-0-471-29340-8 (second edition).
  2. T. Wreidt, Light scattering theories and computer codes, Journal of Quantitative Spectroscopy and Radiative Transfer, 110, 833–843, 2009.
  3. H. A. Yousif and E. Boutros, A FORTRAN code for the scattering of EM-plane waves by an infinitely long cylinder at oblique incidence", Comput. Phys. Commun. 69, 406–414 (1992).
  4. Hawkins, Stuart C. (2020). "Algorithm 1009: MieSolver-An Object-Oriented Mie Series Software for Wave Scattering by Cylinders". ACM Transactions on Mathematical Software. 46: 19:1–19:28. doi:10.1145/3381537. S2CID 218518062.
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