Strategy for the estimation of the scattering and absorption coefficients in one-dimensional participating media

In this work a strategy for the estimation of absorption and scattering coefficients in one-dimensional participating media is presented. Media are considered with the absorption coefficient in the range [0.1 to 1.0] and the scattering coefficient between [0.1-1.0]. The direct problem was solved wit...

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Detalles Bibliográficos
Autores: Berrocal Tito, M., Carita Montero, R. F., Bravo, J. A., da Silva Neto, A. J.
Tipo de recurso: artículo
Estado:Versión publicada
Fecha de publicación:2014
País:Perú
Institución:Universidad Nacional Mayor de San Marcos
Repositorio:Revistas - Universidad Nacional Mayor de San Marcos
Idioma:español
OAI Identifier:oai:revistasinvestigacion.unmsm.edu.pe:article/8674
Acceso en línea:https://revistasinvestigacion.unmsm.edu.pe/index.php/fisica/article/view/8674
Access Level:acceso abierto
Palabra clave:inverse problem
Bregman distance
heat transfer
entropy Havdra - Charvát.
problema inverso
distancia de Bregman
transferencia de calor
entropía de Havdra- Charvát.
Descripción
Sumario:In this work a strategy for the estimation of absorption and scattering coefficients in one-dimensional participating media is presented. Media are considered with the absorption coefficient in the range [0.1 to 1.0] and the scattering coefficient between [0.1-1.0]. The direct problem was solved with the discrete ordinates and finite difference methods. In order to solve the inverse problem the following strategy consists of (a) find the absorption coefficient considering the scattering coefficient with an approximate value. 0.01, (b) find the scattering coefficient value using the absorption coefficient estimated in (a). The error function is defined as the difference between the measured value by the detector and the calculated by the direct problem. The algorithm used for the solution is to minimize the Bregman distance subject to the error function. Bregman distance was constructed with a related function to the entropy of Havdra-Charvát. Cases random noise tests to 2% in the measured data are presented. In order to find the best estimate we adopt as a criterion for comparison of the relative standard quadratic error.