生物组织中的光子输运
蒙特卡罗方法
扩散方程
物理
光子扩散
球谐函数
辐射传输
扩散
抛物型偏微分方程
偏微分方程
矢量球谐函数
分歧(语言学)
数学分析
光学
谐波
计算物理学
数学
动态蒙特卡罗方法
量子力学
光源
语言学
服务(商务)
电压
直接模拟蒙特卡罗
经济
哲学
经济
统计
作者
Jorge Bouza Domínguez,Yves Bérubé-Lauzière
出处
期刊:Applied optics-OT
[Optica Publishing Group]
日期:2010-03-05
卷期号:49 (8): 1414-1414
被引量:35
摘要
We present a simplified spherical harmonics approximation for the time-domain radiative transfer equation including the source-divergence effect. This leads to a set of coupled partial differential equations (PDEs) of the parabolic type that model diffuse light propagation in biological-tissue-like media. We introduce a finite element approach for solving these PDEs, thereby obtaining the time-dependent spatial profile of the fluence. We compare the results with the diffusion equation and Monte Carlo simulations. The fluence obtained via our model is shown to reproduce well the Monte Carlo results in all cases and improves on the solution of the diffusion equation in homogeneous diffusive-defying media. Our solution also shows more sensitivity than the diffusion equation to changes in the absorption coefficient of small inclusions.
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