REFERENCES
- K. S. SMITH, “Assembly Homogenization Techniques for Light Water Reactor Analysis,” Prog. Nucl. Energy, 17, 303 (1986).
- A. HÉBERT and G. MATHONNIERE, “Development of a Third-Generation Superhomogénéisation Method for the Homogenization of a Pressurized Water Reactor Assembly,” Nucl. Sci. Eng., 115, 129 (1993).
- K. T. CLARNO and M. L. ADAMS, “Capturing the Effects of Unlike Neighbors in Single-Assembly Calculations,” Nucl. Sci. Eng., 149, 182 (2005).
- H. HIRUTA and D. Y. ANISTRATOV, “Homogenization Method for the Two-Dimensional Low-Order Quasi-Diffusion Equations for Reactor Core Calculations,” Nucl. Sci. Eng., 154, 328 (2006).
- J. Y. CHO and H. G. JOO, “Solution of the C5G7 MOX Benchmark Three-Dimensional Extension Problems by the DeCART Direct Whole Core Calculation Code,” Prog. Nucl. Energy, 48, 456 (2006).
- S. KOSAKA, “3-D Extension C5G7 MOX Benchmark Results Using CHAPLET-3D,” Prog. Nucl. Energy, 48, 439 (2006).
- G. S. LEE and N. Z. CHO, “2D/1D Fusion Method Solutions of the Three-Dimensional Transport OECD Benchmark Problem C5G7 MOX,” Prog. Nucl. Energy, 48, 410 (2006).
- E. E. LEWIS, G. PALMIOTTI, T. A. TAIWO, R. N. BLOMQUIST, M. A. SMITH, and N. TSOULFANIDIS, “Benchmark Specification for Deterministic 2-D/3-D MOX Fuel Assembly Transport Calculations Without Spatial Homogenization (C5G7 MOX),” NEA/NSC/DOC(2001)4, Organisation for Economic Co-operation and Development (Mar. 2001).
- M. A. SMITH, E. E. LEWIS, and B.-C. NA, “Benchmark on Deterministic 2-D MOX Fuel Assembly Transport Calculations Without Spatial Homogenization,” Prog. Nucl. Energy, 45, 107 (2004).
- C. B. CARRICO, E. E. LEWIS, and G. PALMIOTTI, “Three-Dimensional Variational Nodal Transport Methods for Cartesian, Triangular, and Hexagonal Criticality Calculations,” Nucl. Sci. Eng., 111, 168 (1992).
- G. PALMIOTTI, E. E. LEWIS, and C. B. CARRICO, “VARIANT: VARIational Anisotropic Nodal Transport for Multidimensional Cartesian and Hexagonal Geometry Calculation,” ANL-95/40, Argonne National Laboratory (1995).
- M. A. SMITH, N. TSOULFANIDIS, E. E. LEWIS, G. PALMIOTTI, and T. A. TAIWO, “A Finite Subelement Generalization of the Variational Nodal Method,” Nucl. Sci. Eng., 144, 36 (2003).
- M. A. SMITH, G. PALMIOTTI, E. E. LEWIS, and N. TSOULFANIDIS, “An Integral Form of the Variational Nodal Method,” Nucl. Sci. Eng., 146, 141 (2004).
- E. E. LEWIS, M. A. SMITH, and G. PALMIOTTI, “Quasi-Reflected Interface Conditions for Variational Nodal Lattice Calculations,” Proc. Int. Topl. Mtg. Advances in Nuclear Analysis and Simulation (PHYSOR-2006), Vancouver, Canada, September 10–14, 2006, American Nuclear Society (2006).
- E. E. LEWIS, M. A. SMITH, and G. PALMIOTTI, “A New Paradigm for Whole Core Neutron Transport Without Homogenization,” Proc. Joint Int. Mtg. Mathematics and Computation and Supercomputing for Nuclear Applications, Monterey, California, April 15–19, 2007, American Nuclear Society (2007).
- E. E. LEWIS, C. B. CARRICO, and G. PALMIOTTI, “Variational Nodal Formulation for the Spherical Harmonics Equations,” Nucl. Sci. Eng., 122, 194 (1996).
- G. YA. RUMYANTSEV, “Boundary Conditions in the Spherical Harmonic Method,” J. Nucl. Energy, 16, 111 (1962).
- W. S. YANG, M. A. SMITH, G. PALMIOTTI, and E. E. LEWIS, “Interface Conditions for Spherical Harmonics Methods,” Nucl. Sci. Eng., 150, 257 (2005).
- S. VAN CRIEKINGEN E. E. LEWIS, and R. BEAUWENS, “Mixed-Hybrid Transport Discretizaton Using Even and Odd PN Expansions,” Nucl. Sci. Eng., 152, 149 (2006).
- M. A. SMITH, E. E. LEWIS, and B.-C. NA, “Benchmark on Deterministic 3-D MOX Fuel Assembly Transport Calculations without Spatial Homogenization,” Prog. Nucl. Energy, 48, 383 (2006).