25 March 2013 Efficient Green's function and Jacobian matrix calculations for optical tomography problems near boundaries using phase-function-corrected diffusion theory approximations
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Abstract
Recently developed phase-function corrected diffusion theory is applied to the problem of computing Jacobian matrices in the transport regime. We propose additional approximations that lead to simplified transport-regime expressions for the Jacobian matrices that may be evaluated by Monte Carlo simulations, phase-function-corrected diffusion models, or recently developed analytical solutions to the radiative transport equation.
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Roger J. Zemp, "Efficient Green's function and Jacobian matrix calculations for optical tomography problems near boundaries using phase-function-corrected diffusion theory approximations", Proc. SPIE 8578, Optical Tomography and Spectroscopy of Tissue X, 857813 (25 March 2013); doi: 10.1117/12.2005057; https://doi.org/10.1117/12.2005057
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