On the Ronen Method in Simple 1-D Geometries for Neutron Transport Theory Solutions

IF 0.7 4区工程技术 Q3 MATHEMATICS, APPLIED

Journal of Computational and Theoretical Transport Pub Date : 2020-11-23 DOI:10.1080/23324309.2020.1843496

D. Tomatis, R. Gross, E. Gilad

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引用次数: 3

Abstract

Abstract In this work, we apply the Ronen method to obtain highly-accurate approximations to the solution of the neutron transport equation in simple homogeneous problems. Slab, cylindrical, and spherical geometries are studied. This method demands successive resolutions of the diffusion equation, where the local diffusion constants are modified in order to reproduce new estimates of the currents by a transport operator. The diffusion solver employs here finite differences and the transport-corrected currents are forced in the numerical scheme by means of drift terms, like in the CMFD scheme. Boundary conditions are discussed introducing proper approximations to save the particle balance in case of reflection in the slab. The solution from the Ronen iterations is compared against reference results provided by the collision probability method. More accurate estimates of the currents are provided by integral transport equations using first flight escape probabilities. Slow convergence on the scalar flux is analyzed, although the results match the reference solutions in the limit of fine meshes and far from the bare boundary.

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中子输运理论解的简单一维几何Ronen方法

在本工作中，我们应用Ronen方法获得了简单齐次问题中中子输运方程解的高精度近似。板状，圆柱形和球面几何形状的研究。这种方法要求扩散方程的连续解析，其中局部扩散常数被修改，以便通过输运算子再现对电流的新估计。扩散求解器在这里采用有限差分，输运修正电流在数值格式中通过漂移项强制，就像在CMFD格式中一样。讨论了边界条件，引入了适当的近似，以便在板内反射的情况下保存颗粒平衡。将Ronen迭代得到的解与碰撞概率法提供的参考结果进行了比较。使用首次飞行逃逸概率的积分输运方程提供了更准确的电流估计。在细网格极限和远离裸边界的情况下，计算结果与参考解相符，但对标量通量的收敛速度较慢。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of Computational and Theoretical Transport Mathematics-Mathematical Physics

CiteScore

1.30

自引率

0.00%

发文量

期刊介绍： Emphasizing computational methods and theoretical studies, this unique journal invites articles on neutral-particle transport, kinetic theory, radiative transfer, charged-particle transport, and macroscopic transport phenomena. In addition, the journal encourages articles on uncertainty quantification related to these fields. Offering a range of information and research methodologies unavailable elsewhere, Journal of Computational and Theoretical Transport brings together closely related mathematical concepts and techniques to encourage a productive, interdisciplinary exchange of ideas.