EPJ Web Conf.
Volume 247, 2021PHYSOR2020 – International Conference on Physics of Reactors: Transition to a Scalable Nuclear Future
|Number of page(s)||8|
|Published online||22 February 2021|
- N. H. Hart. A Residual-Based A Posteriori Spatial Error Estimator for the SN Neutron Transport Equation. Master’s thesis, NC State University (2018). [Google Scholar]
- N. H. Hart and Y. Y. Azmy. “The Residual Source Estimator for DGFEM-1 SN Neutron Transport Spatial Discretization Error Estimation.” In International Conference on Mathematics and Computational Methods Applied to Nuclear Science & Engineering (M&C 2019). Portland, OR, USA (2019). [Google Scholar]
- J. C. Ragusa and Y. Wang. “A Two-Mesh Adaptive Mesh Refinement Technique for SN Neutral-Particle Transport Using a Higher-Order DGFEM.” Journal of Computational and Applied Mathematics, volume 223, pp. 3178–3188 (2010). [Google Scholar]
- J. I. Duo, Y. Y. Azmy, and L. T. Zikatanov. “A posteriori error estimator and AMR for discrete ordinates nodal transport methods.” Annals of Nuclear Energy, volume 36, pp. 268–273 (2009). [Google Scholar]
- E. Lewis and J. W.F. Miller. Computational Methods of Neutron Transport. American Nuclear Society, Inc., La Grange Park, Illinois (1993). [Google Scholar]
- J. I. Duo. Error Estimates for Nodal and Short Characteristics Spatial Approximations of Two-Dimensional Discrete Ordinates Method. Ph.D. thesis, The Pennsylvania State University, University Park, PA (2008). [Google Scholar]
- G. R. Richter. “An Optimal-Order Error Estimate for the Discontinuous Galerkin Method.” Mathematics of Computation, volume 50(181), pp. 75–88 (1988). [Google Scholar]
- W. L. Oberkampf and C. J. Roy. Verification and Validation in Scientific Computing. Cambridge University Press, Cambridge, UK; New York (2010). [CrossRef] [Google Scholar]
- J. Arkuszewski. “Rigorous Analysis of the Diamond Approximation for the Neutron Transport Equation.” Numerical Reactor Calculations, (STI/PUB/307), p. 113 (1972). [Google Scholar]
- J. I. Duo and Y. Y. Azmy. “Spatial Convergence Study of Discrete Ordinates Methods Via the Singular Characteristic Tracking Algorithm.” Nuclear Science and Engineering, volume 162, pp. 41–55 (2009). [Google Scholar]
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