Numerical results for finite order X and Y functions of radiative transfer |
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Authors: | R Bellman PTY Poon S Ueno |
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Institution: | Departments of Electrical Engineering, Mathematics and Medicine, University of Southern California, Los Angeles, California 90007, U.S.A. |
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Abstract: | It is well known that, in the theory of radiative transfer, Chandrasekhar's X and Y functions play an important role in the diffuse reflection and transmission problem (cf. Chandrashekhar(1)). In a preceding paper (cf. Bellmanet al.(10)), graphs and selected tables of these functions covering wide ranges of slab thickness and albedos for single scattering have been provided. In this paper, making use of a system of coupled integral recurrence relations for finite order X and Y functions (cf. Bellmanet al.(14)), numerical results for these basic functions are tabulated up to optical thickness τ = 2.0 from τ = 0.1, assuming the conservative case of isotropic scattering. The maximum order of these functions is taken to be fifteenth. It is shown that the accuracy obtained is satisfactory in the domain under consideration. Furthermore, numerical results for Chandrasekhar's approximation for X and Y functions are also tabulated for stabs of small optical thickness. |
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