排序方式: 共有20条查询结果,搜索用时 0 毫秒
1.
本文针对二维非线性Schr?dinger方程,提出两类局部守恒算法.不需要考虑边界条件,即可保持任意时空区域上相应的局部能量守恒律和局部动量守恒律.在合适的边界条件下,它们能自然地保持电荷、全局能量或全局动量守恒律.本文同时对算法进行了守恒分析和误差分析.在数值实验部分,本文构造了类似的多辛Preissman算法进行比较,数值结果验证了其长时间计算的优势. 相似文献
2.
Hamilton-Jacobi方程的小波Galerkin方法 总被引:1,自引:0,他引:1
本文选择Daubechies小波尺度函数空间作为Galerkin方法的测试函数空间,并将其应用于Hamilton-Jacobi方程,得到了求解Hamilton-Jacobi方程的小波Galerkin方法的数值格式.由于小波在时间和频率上的局部性,本方法适用于处理具有奇异解的问题,可以有效地防止数值振荡.数值试验显示,本方法是有效的. 相似文献
3.
4.
Considering the coupled nonlinear Schr¨odinger system with multiply components, we provide a novel framework for constructing energy-preserving algorithms. In detail, based on the high order compact finite difference method, Fourier pseudospectral method and wavelet collocation method for spatial discretizations, a series of high accurate conservative algorithms are presented. The proposed algorithms can preserve the corresponding discrete charge and energy conservation laws exactly, which would guarantee their numerical stabilities during long time computations.Furthermore, several analogous multi-symplectic algorithms are constructed as comparison. Numerical experiments for the unstable plane waves will show the advantages of the proposed algorithms over long time and verify the theoretical analysis. 相似文献
5.
6.
Considering the coupled nonlinear Schrodinger system with multiply components, we provide a novel framework for constructing energy-preserving algorithms. In detail, based on the high order compact finite difference method, Fourier pseudospectral method and wavelet collocation method for spatial discretizations, a series of high accurate conservative algorithms are presented. The proposed algorithms can preserve the corresponding discrete charge and energy conservation laws exactly, which would guarantee their numerical stabilities during long time computations. Furthermore, several analogous multi-symplectic algorithms are constructed as comparison. Numerical experiments for the unstable plane waves will show the advantages of the proposed algorithms over long time and verify the theoretical analysis. 相似文献
7.
8.
《高等数值分析》是一门与实际联系紧密的数学公共课程,它理论深刻,应用广泛.本文结合实际应用,为《高等数值分析》中常微分方程数值解部分设计了一个教学案例,通过理论分析和数值实验向学生展示了刚性问题的概念和相关数值方法,并对《高等数值分析》课程教学案例的设计进行了思考. 相似文献
9.
10.