Yousry Azmy

Hoagland, D. S., & Azmy, Y. Y. (2021). Hybrid approaches for accelerated convergence of block-Jacobi iterative methods for solution of the neutron transport equation. JOURNAL OF COMPUTATIONAL PHYSICS, 439. https://doi.org/10.1016/j.jcp.2021.110382

Hu, X., & Azmy, Y. Y. (2021). On the Regularity Order of the Pointwise Uncollided Angular Flux and Asymptotic Convergence of the Discrete Ordinates Approximation of the Scalar Flux. NUCLEAR SCIENCE AND ENGINEERING, 195(6), 598–613. https://doi.org/10.1080/00295639.2020.1860634

Hart, N. H., & Azmy, Y. Y. (2021, November 8). Solution Irregularity Remediation for Spatial Discretization Error Estimation for S-N Transport Solutions. NUCLEAR SCIENCE AND ENGINEERING. https://doi.org/10.1080/00295639.2021.1982548

Hoagland, D. S., Yessayan, R. A., & Azmy, Y. Y. (2021, May 10). Solution of the Neutron Transport Equation on Unstructured Grids Using the Parallel Block Jacobi-Integral Transport Matrix Method via the Novel Green's Function ITMM Construction Algorithm on Massively Parallel Computer Systems. NUCLEAR SCIENCE AND ENGINEERING. https://doi.org/10.1080/00295639.2021.1898309

Hu, X., & Azmy, Y. Y. (2020). Asymptotic convergence of the angular discretization error in the scalar flux computed from the particle transport equation with the method of discrete ordinates. ANNALS OF NUCLEAR ENERGY, 138. https://doi.org/10.1016/j.anucene.2019.107199

Schmidt, K., Smith, R. C., Hite, J., Mattingly, J., Azmy, Y., Rajan, D., & Goldhahn, R. (2019). Sequential optimal positioning of mobile sensors using mutual information. STATISTICAL ANALYSIS AND DATA MINING, 12(6), 465–478. https://doi.org/10.1002/sam.11431

Nelson, N., & Azmy, Y. (2017). Numerical convergence and validation of the DIMP inverse particle transport model. Nuclear Engineering and Technology, 49(6), 1358–1367. https://doi.org/10.1016/J.NET.2017.07.009

Nelson, N., Azmy, Y., Gardner, R. P., Mattingly, J., Smith, R., Worrall, L. G., & Dewji, S. (2017). Validation and uncertainty quantification of detector response functions for a 1″×2″ NaI collimated detector intended for inverse radioisotope source mapping applications. Nuclear Instruments and Methods in Physics Research Section B: Beam Interactions with Materials and Atoms, 410, 1–15. https://doi.org/10.1016/J.NIMB.2017.07.015

Barichello, L. B., Tres, A., Picoloto, C. B., & Azmy, Y. Y. (2016). Recent Studies on the Asymptotic Convergence of the Spatial Discretization for Two-Dimensional Discrete Ordinates Solutions. JOURNAL OF COMPUTATIONAL AND THEORETICAL TRANSPORT, 45(4), 299–313. https://doi.org/10.1080/23324309.2016.1171242

Schunert, S., & Azmy, Y. (2015). Comparison of spatial discretization methods for solving the S-N equations using a three-dimensional method of manufactured solutions benchmark suite with escalating order of nonsmoothness. Nuclear Science and Engineering, 180(1), 1–29. https://doi.org/10.13182/nse14-77

Anistratov, D. Y., & Azmy, Y. Y. (2015). Iterative stability analysis of spatial domain decomposition based on block Jacobi algorithm for the diamond-difference scheme. JOURNAL OF COMPUTATIONAL PHYSICS, 297, 462–479. https://doi.org/10.1016/j.jcp.2015.05.033

Hykes, J. M., & Azmy, Y. Y. (2015). Radiation Source Mapping with Bayesian Inverse Methods. NUCLEAR SCIENCE AND ENGINEERING, 179(4), 364–380. https://doi.org/10.13182/nse13-91

Schunert, S., & Azmy, Y. (2013). Using the Cartesian Discrete Ordinates Code DORT for Assembly-Level Calculations. NUCLEAR SCIENCE AND ENGINEERING, 173(3), 233–258. https://doi.org/10.13182/nse11-17

Ferrer, R. M., & Azmy, Y. Y. (2012). A Robust Arbitrarily High-Order Transport Method of the Characteristic Type for Unstructured Grids. NUCLEAR SCIENCE AND ENGINEERING, 172(1), 33–51. https://doi.org/10.13182/nse10-106

Gill, D. F., & Azmy, Y. Y. (2011). Newton's Method for Solving k-Eigenvalue Problems in Neutron Diffusion Theory. NUCLEAR SCIENCE AND ENGINEERING, 167(2), 141–153. https://doi.org/10.13182/nse09-98

Gill, D. F., Azmy, Y. Y., Warsa, J. S., & Densmore, J. D. (2011). Newton's Method for the Computation of k-Eigenvalues in S-N Transport Applications. NUCLEAR SCIENCE AND ENGINEERING, 168(1), 37–58. https://doi.org/10.13182/nse10-01

Rosa, M., Azmy, Y. Y., & Morel, J. E. (2010). On the Degradation of Cell-Centered Diffusive Preconditioners for Accelerating S-N Transport Calculations in the Periodic Horizontal Interface Configuration. NUCLEAR SCIENCE AND ENGINEERING, 166(3), 218–238. https://doi.org/10.13182/nse09-69

Duo, J. I., Azmy, Y. Y., & Zikatanov, L. T. (2009, April). A posteriori error estimator and AMR for discrete ordinates nodal transport methods. ANNALS OF NUCLEAR ENERGY, Vol. 36, pp. 268–273. https://doi.org/10.1016/j.anucene.2008.12.008

Rosa, M., Azmy, Y. Y., & Morel, J. E. (2009). Properties of the S-N-equivalent integral transport operator in slab geometry and the iterative acceleration of neutral particle transport methods. Nuclear Science and Engineering, 162(3), 234–252. https://doi.org/10.13182/NSE162-234

Duo, J. I., & Azmy, Y. Y. (2009). Spatial Convergence Study of Discrete Ordinates Methods Via the Singular Characteristic Tracking Algorithm. NUCLEAR SCIENCE AND ENGINEERING, 162(1), 41–55. https://doi.org/10.13182/NSE08-28

Bekar, K. B., & Azmy, Y. Y. (2009, April). TORT solutions to the NEA suite of benchmarks for 3D transport methods and codes over a range in parameter space. ANNALS OF NUCLEAR ENERGY, Vol. 36, pp. 368–374. https://doi.org/10.1016/j.anucene.2008.11.036

Azmy, Y. Y., Gupta, A., & Pugh, F. (2008). Computational Modelling of Genome-Side Transcription Assembly Networks Using a Fluidics Analogy. PLOS ONE, 3(8). https://doi.org/10.1371/journal.pone.0003095

Fischer, J. W., & Azmy, Y. Y. (2007). Comparison via parallel performance models of angular and spatial domain decompositions for solving neutral particle transport problems. Progress in Nuclear Energy, 49(1), 37–60. https://doi.org/10.1016/j.pnucene.2006.08.003

Alim, F., Bekar, K., Ivanov, K., Unlu, K., Brenizer, J., & Azmy, Y. (2006). Modeling and optimization of existing beam port facility of PSBR. Annals of Nuclear Energy, 33(17-18), 1391–1395. https://doi.org/10.1016/j.anucene.2006.10.007

Klingensmith, J. J., Azmy, Y. Y., Gehin, J. C., & Orsi, R. (2006). Tort solutions to the three-dimensional MOX benchmark, 3-D Extension C5G7MOX. Progress in Nuclear Energy, 48(5), 445–455. https://doi.org/10.1016/j.pnucene.2006.01.011

Azmy, Y. Y., Gehin, J. C., & Orsi, R. (2004). Dort solutions to the two-dimensional C5G7MOXbenchmark problem. Progress in Nuclear Energy, 45(2-4), 215–231. https://doi.org/10.1016/j.pnueene.2004.09.011