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Nuclear Science and Engineering Volume 166, 2010 - Issue 1
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Technical Paper

Asymptotic Telegrapher’s Equation (P1) Approximation for the Transport Equation

Shay I. HeizlerBar-Ilan University, Department of Physics, Ramat-Gan, Israel and Nuclear Research Center-Negev, Department of Physics P.O. Box 9001, Beer Sheva 84190, Israel
Pages 17-35 | Published online: 10 Apr 2017

References

  • J. J. DUDERSTADT and W. R. MARTIN, Transport Theory, John Wiley and Sons (1979).
  • G. I. BELL and S. GLADSTONE, Nuclear Reactor Theory, Van Nostrand-Reinhold (1971).
  • E. E. LEWIS and W. F. MILLER, Computational Methods of Neutron Transport, American Nuclear Society, La Grange Park, Illinois (1993).
  • G. C. POMRANING, The Equations of Radiation Hydrodynamics, Pergamon Press (1973).
  • B. DAVISON and J. B. SYKES, Neutron Transport Theory, Oxford University Press (1958).
  • S. P. FRANKEL and E. NELSON, “Methods of Treatment of Displacement Integral Equations,” AECD-3497, Los Alamos Scientific Laboratory (1953).
  • K. M. CASE and P. F. ZWEIFEL, Linear Transport Theory, Addison-Wesley Publishing Company (1967).
  • K. M. CASE, F. DE HOFFMANN, G. PLACZEK, B. CARLSON, and M. GOLDSTEIN, Introduction to The Theory of Neutron Diffusion—Volume I, Los Alamos Scientific Laboratory (1953).
  • G. H. WEISS, “Some Applications of Persistent Random Walks and the Telegrapher’s Equation,” Phys. A, 311, 381 (2002).
  • A. M. WINSLOW, “Extensions of Asymptotic Neutron Diffusion Theory,” Nucl. Sci. Eng., 32, 101 (1968).
  • C. D. LEVERMORE, “A Chapkan-Enskog Approach to Flux-Limited Diffusion Theory,” UCID-18229, Lawrence Livermore Laboratory, University of California Livermore (1979).
  • C. D. LEVERMORE and G. C. POMRANING, “A Flux-Limited Diffusion Theory,” Astrophys. J., 248, 321 (1981).
  • G. C. POMRANING, “A Comparison of Various Flux Limiters and Eddington Factors,” UCID-19220, Lawrence Liver-more Laboratory, University of California Livermore (1981).
  • G. C. POMRANING, “Flux-Limited Diffusion Theory with Anisotropic Scattering,” Nucl. Sci. Eng., 86, 335 (1984).
  • B. SU, “Variable Eddington Factors and Flux Limiters in Radiative Transfer,” Nucl. Sci. Eng., 137, 281 (2001).
  • B. D. GANAPOL, “P1 Approximation to the Time-Dependent Monoenergetic Neutron Transport Equation in Infinite Media,” Transp. Theory Stat. Phys., 9, 145 (1980).
  • J. M. PORRA, J. MASOLIVER, and G. H. WEISS, “When the Telegrapher’s Equation Furnishes a Better Approximation to the Transport Equation than the Diffusion Approximation,” Phys. Rev. E, 55, 7771 (1997).
  • I. KUSCER and P. F. ZWEIFEL, “Time-Dependent One-Speed Albedo Problem for a Semi-Infinite Medium,” J. Math. Phys., 6, 1125 (1965).
  • J. MASOLIVER, J. M. PORRA, and G. H. WEISS, “Solutions of the Telegrapher’s Equation in the Presence of Traps,” Phys. Rev. A, 45, 2222 (1992).
  • J. MASOLIVER, J. M. PORRA, and G. H. WEISS, “Solution to the Telegrapher’s Equation in the Presence of Reflecting and Partly Reflecting Boundaries,” Phys. Rev. E, 48, 939 (1993).
  • J. MASOLIVER and G. H. WEISS, “Telegrapher’s Equations with Variable Propagation Speeds,” Phys. Rev. E, 49, 3852 (1994).
  • D. J. DURIAN and J. RUDNICK, “Photon Migration at Short Times and Distances and in Cases of Strong Absorption,” J. Optical Soc. Am., 14, 235 (1997).
  • S. GODOY and L. S. GARCIA-COLIN, “Nonvalidity of the Telegrapher’s Diffusion Equation in Two and Three Dimensions for Crystalline Solids,” Phys. Rev. E, 55, 2127 (1997).
  • R. G. McCLARREN, J. P. HOLLOWAY, and T. A. BRUNNER, “On Solutions to the Pn Equations for Thermal Radiative Transfer,” J. Quant. Spectrosc. Radiat. Transfer, 109, 389 (2008).
  • B. J. HOENDERS and R. GRAAFF, “Telegrapher’s Equation for Light Derived from the Transport Equation,” Optics Commun., 255, 184 (2005).
  • T. I. GOMBOSI, J. R. JOKIPII, J. KOTA, K. LORENCZ, and L. L. WILLIAMS, “The Telegraph Equation in Charged Particle Transport,” Astrophys. J., 403, 377 (1993).
  • E. KH. KAGHASHVILI, G. P. ZANK, J. Y. LU, and W. DROGE, “Transport of Energetic Charged Particles. Part 2. Small-Angle Scattering,” J. Plasma Phys., 70, 505 (2004).
  • G. I. BELL, G. E. HANSEN, and H. A. SANDMEIER, “Multitable Treatments of Anisotropic Scattering in SN Multi-group Transport Calculations,” Nucl. Sci. Eng., 28, 376 (1967).
  • H. HAYASAKA and S. TAKEDA, “Study of Neutron Wave Propagation,” J. Nucl. Sci. Technol., 5, 564 (1968).
  • G. F. NIEDERAUER, “Solution of the Telegrapher’s Equation for an Arbitrary Infinite Plane Source,” Nucl. Sci. Eng., 38, 70 (1969).
  • G. E. ROBERTS and H. KAUFMAN, Table of Laplace Transforms, W. B. Saunders Company (1966).
  • S. GOLDSTEIN, “On Diffusion by Discontinuous Movements, and on the Telegraph Equation,” Quarterly J. Mech. Appl. Math., 4, 129 (1951).
  • A. ISHIMARU, “Diffusion of Light in Turbid Material,” Appl. Optics, 28, 2210 (1989).
  • I. S. GRADSHTEYN and I. M. RYZHIK, Table of Integrals, Series, and Products, Academic Press (1965).
  • D. OFER, Personal Communication.
  • G. C. POMRANING and M. CLARK, Jr., “A New Asymptotic Diffusion Theory,” Nucl. Sci. Eng., 17, 227 (1963).
  • R. J. DOYAS and B. L. KOPONEN, “Linearly Anisotropic Extensions of Asymptotic Neutron Diffusion Theory,” Nucl. Sci. Eng., 41, 226 (1970).
  • R. J. DOYAS and B. L. KOPONEN, “Application of Asymptotic Diffusion Theory Methods to Small System,” UCRL-70012, Lawrence Radiation Laboratory, University of California Livermore (1967).
  • S. A. EL-WAKIL, A. R. DEGHEIDY, and M. SALLAH, “Time-Dependent Neutron Transport in a Semi-Infinite Random Medium,” Ann. Nucl. Energy, 30, 1283 (2003).
  • S. A. EL-WAKIL, A. R. DEGHEIDY, and M. SALLAH, “Time-Dependent Radiation Transfer in a Semi-Infinite Stochastic Medium with Rayleigh Scattering,” J. Quant. Spectrosc. Radiat. Transfer, 85, 13 (2004).
  • J. BENGSTON, “The Asymptotic Time-Dependent Transport Equation,” UCRL-5209, Radiation Laboratory, University of California Berkeley (1958).
  • B. D. GANAPOL, “Homogeneous Infinite Media Time-Dependent Analytic Benchmarks for X-TM Transport Methods Development,” Technical Report, Los Alamos National Laboratory (Mar. 1999).
  • H. KRAINER and N. PUCKER, “Propagation of Neutron Pulses According to the Time Dependent P1-Approximation,” Atomkernenergie, 14, 4 11 (1969).
  • B. D. GANAPOL and L. M. GROSSMAN, “The Collided Flux Expansion Method for Time-Dependent Neutron Transport,” Nucl. Sci. Eng., 52, 454 (1973).
  • B. D. GANAPOL, “Reconstruction of the Time-Dependent Monoenergetic Neutron Flux from Moments,” J. Comput. Phys., 59, 468 (1985).
  • K. R. OLSON and D. L. HENDERSON, “Numerical Benchmark Solutions for Time-Dependent Neutral Particle Transport in One-Dimensional Homogeneous Media Using Integral Transport,” Ann. Nucl. Energy, 31, 1495 (2004).
  • B. D. GANAPOL, P. W. McKENTY, and K. L. PEDDI-CORD, “The Generation of Time-Dependent Neutron Transport Solutions in Infinite Media,” Nucl. Sci. Eng., 64, 317 (1977).
  • V. C. BOFFI, “Space-Time Flux Distribution in Neutron Transport Theory,” Nukleonik, 8, 448 (1966).

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