| 1. | This method prepends the scaling matrix to the transform
该方法预先计算对变换的缩放矩阵。 |
| 2. | This method prepends the scaling matrix to the transformation
此方法将缩放矩阵添加到变换前。 |
| 3. | By the scaling matrix
的变换矩阵左乘缩放矩阵。 |
| 4. | Better results are attainable by using this method without large - scale matrix operations
与常规方法相比,这种方法不需要进行大规模的矩阵运算就可较精确地估计出目标的位置。 |
| 5. | This algorithm applies the small - scale matrix operation to replace the large - scale matrix operation by carefully analyzing the character of the support vector distributing
这种算法通过仔细分析sv分布的特点,采用小规模的矩阵运算来代替大规模的矩阵运算。 |
| 6. | At the same time , optimum matrix transfer method is used to improve contribution weighing of scale matrix evaluation method so that the consistency is naturally satisfied and extra consistency test is not needed
同时,采用最优传递矩阵法对标度矩阵判断法确定权重进行了改进,使之自然满足一致性要求,从而避免一致性检验。 |
| 7. | We use a scaling matrix which make the algorithm generate sequences of point in trust region and the interior of the feasible set . because of the boundedness of the trust region , trust region algorithm can use non - convex approximate models
构造合理的仿射变换矩阵,在投影空间构造信赖域子问题,产生迭代方向,使迭代点既保持在信赖域内,又是严格可行域的内点。 |
| 8. | The object satisfied orthogonal condition , by introducing the proper scaling matrix . after verification of the pre - condition , the controller was designed , using the resolving method of state feedback standard control problem based on riccati inequality
并通过引入适当的标定矩阵的方法,使被控对象满足正交条件,在验证前提条件之后,采用基于riccati不等式的状态反馈h ~标准控制问题的解法进行控制器设计。 |
| 9. | As an example , the implementation of the laplace equation with the gridless method has been presented at first and the resulting large scale matrix equations are solved by gmres algorithm . the numerical simulations of the flows over a cylinder are tested successfully with clouds of different scales , which shows the " cloud " effects on the computational accuracy
本文先以代表定常不可压位势绕流的laplace方程为例,研究了laplace方程的无网格离散形式,并运用gmres高效算法对其快速求解,数值模拟了典型的圆柱绕流;并通过不同点云尺度的数值模拟,显示出点云尺度对计算精度的影响。 |
