REFERENCES
- Anistratov, D. (2005). Consistent spatial approximation of the low-order quasidiffusion equations on coarse grids. Nucl. Sci. Eng. 149:138161.
- Anistratov, D.Y., Jones, J. (2014). Spatial homogenization of transport discretization schemes. J. of Comp. Theor. Trans. 43: 262–288.
- Hebert, A. (1993). A consistent techniques for the pin-by-pin homogenization of a pressurized water reactor assembly. Nucl Sci Eng 113:227–238.
- Ilas, D., Rahnema, F. (2003). A heterogeneous coarse mesh transport method. Transp Theor Statistic Phys 32:445–471.
- Larsen, E., Morel, J. (2010). Advances in discrete-ordinates methodology. In: Azmy, Y., Sartori., E., eds. Nuclear Computational Science: A Century in Review. . New York: Springer. 1–84.
- Lewis, E., Smith, M., Palmiotti, G. (2009). A new paradigm for local-global coupling in whole-core neutron transport. Nucl Sci Eng 161:279–288.
- Sanchez, R. (2009). Assembly homogenization techniques for core calculations. Prog Nucl. Energ. 51:1431.
- Sanchez, R. (2012). Prospects in deterministic three-dimensional whole-core transport calculations. Nucl Sci Tech 44:113–150.
- Seubert, A. (2010). Pin cell discontinuity factors in the transient 3-D discrete ordinates code TORTTD. Proceedings of PHYSOR 2010, Pittsburgh, USA, May 9–14.
- Smith, K. (1986). Assembly homogenization techniques for light water reactor analysis. Prog Nucl Energ 17:303–335.
- Smith, K. Rhodes III, J. (2002). Full-core, 2-D, LWR core calculations with CASMO-4E. Proceedings of PHYSOR 2002, Seoul, Korea, October 7–10.
- Sood, A., Forster, R., Parsons, D. (2003). Analytical benchmark test set for criticality code verification. Prog Nucl Energ 42:55–106.
- Strakhovskaya, L.G., Fedorenko, R.P. (1980). A version of the finite element method. USSR Comp. Math. and Math. Phys. 19:6273.
- Young, M., Collins, B., Martin, W. (2013). 2-D/3-D coupling between the method of characteristics and discrete ordinates. Trans American Nucl Soc 109:699–702.