摘要
提出了一种基于节块内瞬态中子通量展开的六角形几何时-空动力学方程数值解法.在该方法中,各群中子通量分布用解析基函数和二阶正交多项式近似展开,而包含各组缓发中子先驱核浓度的固定源项则利用多项式进行近似.将面平均偏流及其一次矩作为节块之间的耦合条件,不但明显改善了节块耦合关系,而且使得响应矩阵技术比较容易地应用于迭代求解过程.对二维、三维基准问题计算表明,该方法能高效、准确地给出各时间步内的堆芯总功率和节块功率分布.
An efficient nodal method for the hexagonal-z geometry was proposed. In this numerical solution of space-time kinetics equation in method, the intranodal flux distributions are expanded by analytic basis functions and orthogonal second-order polynomials for each group, and the fixed source terms including delayed neutron precursor concentration are approximated in terms of polynomials. The zero-and first-order moments of partial currents are adopted as the nodal coupled conditions, which not only greatly improve the nodal coupling relations, but also considerably facilitate the utilization of the response matrix technique for the iterative solution of spacetime kinetics equation. The numerical results for the two-and three-dimensional benchmark problems show that the transient core powers and nodal power distributions can be predicted accurately in each time-step calculations.
出处
《西安交通大学学报》
EI
CAS
CSCD
北大核心
2006年第5期601-604,608,共5页
Journal of Xi'an Jiaotong University
关键词
时-空动力学方程
六角形几何
解析基函数
响应矩阵
space-time kinetics equation
hexagonal geometry
analytic basis function
response matrix
