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TECHNICAL PAPERS: Radiative Heat Transfer

The SKN Approximation for Solving Radiative Transfer Problems in Absorbing, Emitting, and Linearly Anisotropically Scattering Plane-Parallel Medium: Part 2

[+] Author and Article Information
Zekeriya Altaç

Osmangazi University, School of Engineering and Architecture, Mechanical Engineering Department, 26480 Bati Meselik-Eskisehir Turkey

J. Heat Transfer 124(4), 685-695 (Jul 16, 2002) (11 pages) doi:10.1115/1.1464131 History: Received March 15, 2000; Received October 09, 2001; Online July 16, 2002
Copyright © 2002 by ASME
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References

Altaç, Z., 1989, “The SKN approximation: A New Method for Solving the Integral Transport Equations,” Ph.D. thesis, Iowa State University, Ames, IA.
Altaç,  Z., and Spinrad,  B. I., 1990, “The SKN Method I: A High Order Transport Approximation to Neutron Transport Problems,” Nucl. Sci. Eng., 106, pp. 471–479.
Spinrad,  B. I., and Altaç,  Z., 1990, “The SKN Method II: Heterogeneous Problems,” Nucl. Sci. Eng., 106, pp. 480–488.
Altaç, Z., and Tekkalmaz, M., 2001, “The SKN approximation for Solving Radiation Transport Problems In Absorbing, Emitting, and Scattering Rectangular Geometries,” Proc. 3rd International Symposium on Radiation Transfer, M. P. Mengüç and N. Selçuk, eds., Begell House Inc., New York, pp. 119–129.
Altaç,  Z., 2002, “The SKn Approximation for Solving Radiative Transfer Problems in Absorbing, Emitting, and Isotropically Scattering Plane-parallel Medium: Part I,” ASME J. Heat Transfer, 124(4), pp. 674–684.
Özişik, M. N., 1973, Radiative Transfer, John Wiley & Sons, Inc.
Abramowitz, M., and Stegun, I. A., 1964, Handbook of Mathematical Functions, Dover Publications Inc.
Layolka, S. K., and Tsai, R. W., 1975, “A Numerical Method for Solving Integral Equations of Neutron Transport-II,” Nuclear Science & Engineering, 58 , pp. 317.

Figures

Grahic Jump Location
Variation of em as a function optical thickness using one-term synthetic kernels with Set-1, 2, and 3 quadratures
Grahic Jump Location
Variation of em as a function optical thickness using two-term synthetic kernel with Set-1, 2, and 3 quadratures

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