Application of Jacobian-free Newton-Krylov method for high temperature reactor neutron diffusion equation calculation

Lu Jia’nan; Guo Jiong; Li Fu

doi:10.11884/HPLPB201729.160333

Volume 29 Issue 03

Feb. 2017

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Article Navigation > High Power Laser and Particle Beams > 2017 > 29(03): 036024

Zheng Qi, Wu Hongchun, Li Yunzhao, et al. Coupled stochastic-deterministic method for accelerator-driven subcritical system transient analysis[J]. High Power Laser and Particle Beams, 2018, 30: 016001. doi: 10.11884/HPLPB201830.170243

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Lu Jia’nan, Guo Jiong, Li Fu. Application of Jacobian-free Newton-Krylov method for high temperature reactor neutron diffusion equation calculation[J]. High Power Laser and Particle Beams, 2017, 29: 036024. doi: 10.11884/HPLPB201729.160333

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Application of Jacobian-free Newton-Krylov method for high temperature reactor neutron diffusion equation calculation

doi: 10.11884/HPLPB201729.160333

1.
Key Laboratory of Advanced Reactor Engineering and Safety of Ministry of Education,Collaborative Innovation Center of Advanced Nuclear Energy Technology,Institute of Nuclear and New Energy Technology of Tsinghua University,Beijing 100084,China

Received Date: 2016-06-16
Rev Recd Date: 2016-12-08
Publish Date: 2017-03-15

Abstract

Abstract

This paper studies the application of solving high temperature reactor (HTR) neutron diffusion equation with Jacobian-free Newton-Krylov (JFNK) method. Results show that when solving neutron diffusion equation, the relative residual norm of JFNK method decreases slowly at the beginning. Then the rate of convergence become faster and finally reaches a relatively stable value. This feature is conducive to a high-accuracy solution. In the test of two kinds of additional equations, the neutron diffusion equation with flux normalization condition has a better nonlinear convergence behavior. However, due to the longer computational time in solving linear equations, its total computational time is more than the one with k expression. More efficient preconditioning methods should be studied to improve linear equations.
- high temperature reactor,
- neutron diffusion equation,
- additional equation,
- source iteration,
- JFNK

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