| 1. | Triangular decomposition of affine composition algebras 仿射合成代数的三角分解 |
| 2. | Structure of admissible lattice and stabilizer of module of affine lie algebra 带三角分解李代数的赋值模 |
| 3. | We give the triangular factorization algorithm of toeplitz type matrices in the end 继而推导toeplitz型矩阵的快速三角分解算法。 |
| 4. | We give the triangular factorization algorithm of loewner type matrices in the end 继而推导loewner型矩阵的快速三角分解的算法。 |
| 5. | We give the triangular factorization algorithm of symmetric loewner type matrices in the end 继而推导对称loewner型矩阵的快速三角分解算法。 |
| 6. | It is mainly to some simple matrices to the research of the fast triangular factorization algorithms of special matrices up to now 对于特殊矩阵的快速三角分解算法的研究,目前主要是对一些较简单的矩阵进行的。 |
| 7. | In 7 , we first give the definition of hankel matrices , then we give the triangular factorization algorithm of the inversion of hankel matrices 在7中,首先给出hankel矩阵的定义,然后推导hankel矩阵的逆矩阵的快速三角分解算法。 |
| 8. | In 4 , we first give the definition of loewner type matrices , then we give the triangular factorization algorithm of the inversion of loewner type matrices 在4中,首先给出loewner型矩阵的定义,然后推导loewner型矩阵的逆矩阵的快速三角分解算法。 |
| 9. | In 3 , we first give the definition of toeplitz type matrices , then we give the triangular factorization algorithm of the inversion of toeplitz type matrices 在3中,首先给出toeplitz型矩阵的定义,然后推导toeplitz型矩阵的逆矩阵的快速三角分解算法。 |
| 10. | In 6 , we first give the definition of vandermonde type matrices , then we give the triangular factorization algorithm of the inversion of vandermonde type matrices 在6中,首先给出vandermonde型矩阵的定义,然后推导vandermonde型矩阵的逆矩阵的快速三角分解算法。 |