1) Jacobi-Anger expansion
Jacobi-Anger展开
1.
At first, A focusing matrix is formed by expanding the steering matrix using the Jacobi-Anger expansion, then the Krylov subspace is educed using the Multistage Weiner Filtering arithmetic.
该方法首先对方向矩阵进行Jacobi-Anger展开来构造“聚焦”矩阵,然后通过多级维纳滤波(MSWF:Multi-StageWeinerFilter)算法求得聚焦后的阵列协方差矩阵的Krylov子空间,因为在满足一定的条件下,Krylov子空间等价于阵列的信号子空间,所以可以求得信号的DOA。
2) Jacobi-Anger series
Jacobi-Anger级数
3) Jacobi-Fourier expansion
Jacobi-Fourier展开式
4) Bessel-Jacobi method
Bessel-Jacobi展开方法
5) Jacobi elliptic function expansion
Jacobi椭圆函数展开
1.
On the basis of the principle of homogeneous balance,these equations were resolved by Jacobi elliptic function expansion method and the exact periodic solutions were obtained.
根据齐次平衡原理,用Jacobi椭圆函数展开对这些常微分方程求解,给出了精确的周期解及其模数m→1退化情况下的孤立波解或冲击波解,与定性分析完全一致。
6) Jacobi elliptic function expansion method
Jacobi椭圆函数展开法
1.
Extended Jacobi elliptic function expansion method and its application;
扩展Jacobi椭圆函数展开法及其应用
2.
By the truncated expansion and Jacobi elliptic function expansion methods, we have found some exact solitary wave, rational formal, triangle function and elliptic periodic solutions of the general variable coefficient KdV equation with external force term.
运用截断展开法和Jacobi椭圆函数展开法,求得了含外力项的广义变系数KdV方程的精确孤立波解、有理形式函数解、三角函数解和椭圆周期解。
3.
We will attempt to solve a coupled KdV equations by using two methods which are very effective in solving a large class of nonlinear evolution equations,namely,Jacobi elliptic function expansion method and F-expansion method.
尝试用Jacobi椭圆函数展开法和F展开法来求解耦合KdV方程组。
补充资料:Anger函数
Anger函数
Anger function
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