Artículo
Fully stable numerical calculations for finite onedimensional structures: mapping the Transfer Matrix method
Autor/es | Luque Raigón, Jose Miguel
Helme, Janne Míguez García, Hernán Ruy |
Departamento | Universidad de Sevilla. Departamento de Ingeniería Macánica y de los Materiales |
Fecha de publicación | 2014 |
Fecha de depósito | 2018-05-07 |
Publicado en |
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Resumen | We design a fully stable numerical solution of the Maxwell´s equations with the Transfer Matrix Method (TMM) to understand the interaction between an electromagnetic field and a finite, one-dimensional, nonperiodic structure. ... We design a fully stable numerical solution of the Maxwell´s equations with the Transfer Matrix Method (TMM) to understand the interaction between an electromagnetic field and a finite, one-dimensional, nonperiodic structure. Such an exact solution can be tailored from a conventional solution by choosing an adequate transformation between its reference systems, which induces a mapping between its associated TMMs. The paper demonstrates theoretically the numerical stability of the TMM for the exact solution within the framework of Maxwell´s equations, but the same formalism can efficiently be applied to resolve other classical or quantum linear wave-propagation interaction in one, two, and three dimensions. This is because the formalism is exclusively built up for an in depth analysis of the TMM´s symmetries |
Identificador del proyecto | 09053 |
Cita | Luque Raigón, J.M., Helme, J. y Míguez-García, H. R. (2014). Fully stable numerical calculations for finite onedimensional structures: mapping the Transfer Matrix method. Journal of Quantitative Spectroscopy and Radiative Transfer, 134, 9-20. |
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