| 1. | An inverse eigenvalue problem for generalized periodic jacobi matrices
矩阵的逆特征值问题 |
| 2. | Property of jacobi matrix and theorem of geometric integral transformation
矩阵的性质与几何体上积分变换定理 |
| 3. | A note on necessary and sufficient conditions for the jacobi matrix inverse eigenvalue problem
矩阵的特征值反问题可解的充分必要条件的一个注记 |
| 4. | The inverse jacobi matrix of the 6 - sps parallel manipulator is obtained from differential equations of the reverse displacement analysis
摘要通过对6 - sps型并联机器人位置输入输出方程微分,获得机器人逆雅可比矩阵。 |
| 5. | The key point of 2 - d or 3 - d resistivity tomography imaging is to get elements of sentivity matrix or jacobi matrix
摘要二维或是三维电阻率反演成像研究,最关键的环节是在反演系数矩阵即敏感矩阵(或雅可比矩阵)的求取上。 |
| 6. | The forward and inverse kinematics solutions of a 3 - dof parallel micro - nano manipulator were emphatically analyzed , and the jacobi matrix of kinematics forward solution was derived
重点分析了3 - dof并联微纳操作器的运动学正解和逆解,推导出了运动学正解的雅可比矩阵。 |
| 7. | For this large - scale non - linear equation , a blocked parallel algorithm for the power flow jacobi matrix equation is designed based on the parallel triangular decomposition
对于这一大规模的非线性方程,文中设计了求解潮流计算的雅可比矩阵方程的并行算法,即结合并行化三角分解法的分块法。 |
| 8. | From special to normal , the problem of constructing a jacobi matrix with a prescribed principle submatrix and two ordered defective eigen - pairs has been solved gradually in this paper
遵循从特殊到一般的原则,本文逐步解决了由给定一个顺序主子阵和两个有序缺损特征对构造jacobi矩阵的问题。 |
| 9. | This ph . d . thesis firstly considers the jacobi matrix extension problems constrained by defective eigenpairs and a submatrix , and firstly considers the construction of a jacobi matrix from its mixed - type eigenpairs
首次提出并讨论了非顺序主子矩阵和缺损特征对约束下的jacobi矩阵扩充问题及由混合型特征对构造jacobi矩阵的问题。 |
| 10. | By analysis the structural characterizations of the eigenpairs of the jacobi matrix , the necessary and sufficient conditions for the existence of and the expressions for the above two problems are derived , and the numerical algorithms and examples to solve the problems are also given
通过对jacobi矩阵的特征对的结构特性的分析,得到了上述两个问题有解的充分必要条件,给出了求解问题的数值算法和数值例子。 2 |
