1 |
S.S. Gorodkov, Using core symmetry in Monte Carlo dominance ratio calculations, Nucl. Sci. Eng. 168 (3) (2011) 242-247.
DOI
|
2 |
M.J. Lee, H.G. Joo, D. Lee, K. Smith, Coarse mesh finite difference formulation for accelerated Monte Carlo eigenvalue calculation, Ann. Nucl. Energy 65 (2014) 101-113.
DOI
|
3 |
J. Leppanen, Acceleration of fission source convergence in the Serpent 2 Monte Carlo code using a response matrix based solution for the initial source distribution, Ann. Nucl. Energy 128 (2019) 63-68.
DOI
|
4 |
D.B. Elliott, et al., Deterministically estimated fission source distributions for Monte Carlo k-eigenvalue problems, Ann. Nucl. Energy 119 (2018) 7-22.
DOI
|
5 |
D. She, K. Wang, G.L. Yu, Asymptotic Wielandt method and superhistory method for source convergence in Monte Carlo criticality calculation, Nucl. Sci. Eng. 172 (2) (2012) 127-137.
DOI
|
6 |
Q. Pan, J. Rao, K. Wang, Y. Zhou, Optimal source bias method based on RMC code, Ann. Nucl. Energy 121 (2018) 525-530.
DOI
|
7 |
I. Mickus, J. Dufek, Optimal neutron population growth in accelerated Monte Carlo criticality calculations, Ann. Nucl. Energy 117 (2018) 297-304.
DOI
|
8 |
Y. Chao, A new and rigorous SPN theory - part II: generalization to GSP(N), Ann. Nucl. Energy 110 (2017) 1176-1196.
DOI
|
9 |
Y. Chao, A new and rigorous SPN theory - part III: a succinct summary of the GSPN theory, the P-3 equivalent GSP(3) and implementation issues, Ann. Nucl. Energy 119 (2018) 310-321.
DOI
|
10 |
Q. Pan, K. Wang, An adaptive variance reduction algorithm based on RMC code for solving deep penetration problems, Ann. Nucl. Energy 128 (2019) 171-180.
DOI
|
11 |
Q. Pan, H. Lu, D. Li, K. Wang, A new nonlinear iterative method for SPN theory, Ann. Nucl. Energy 110 (2017) 920-927.
DOI
|
12 |
K. Wang, Z. Li, et al., Rmc - a Monte Carlo code for reactor core analysis, Ann. Nucl. Energy 82 (2015) 121-129.
DOI
|
13 |
Q. Pan, K. Wang, One-step Monte Carlo global homogenization based on RMC code, Nucl. Eng. Technol. 51 (5) (2019) 1209-1217.
DOI
|
14 |
M.A. Smith, E.E. Lewis, B.C. Na, Benchmark on deterministic transport calculations without spatial homogenization -a 2d/3d MOX fuel assembly benchmark, Tech. Rep. 16 (2003). NEA/NSC/DOC OECD/NEA.
|
15 |
I. Petrovic, P. Benoist, BN Theory: Advances and New Models for Neutron Leakage Calculation, Plenum Press, New York, 1996, pp. 223-281.
|
16 |
T. Hideki, M. Yasushi, Accuracy of interpolation methods for resonance self-shielding factors, Nucl. Sci. Technol. 18 (2) (1981) 152-161.
DOI
|
17 |
J. Duderstadt, L. Hamilton, Nuclear Reactor Analysis, John wiley & Sons, Inc, New York, 1976.
|
18 |
Z. Li, Development of Reactor Monte Carlo Code RMC and Research on Related Key Fundamental Methods [D], Tsinghua University, Beijing, 2012.
|
19 |
K.S. Smith, Spatial Homogenization Methods for Light Water Reactor, 1980. PhD thesis in Massachusetts Institute of Technology.
|
20 |
L. Yu, In-depth Investigation and Further Development of Homogenization Method and Discontinuity Factor Theory [D], Shanghai Jiao Tong University, Shanghai, 2014.
|