| 1. | Continuation method for non - linear l1 norm minimization problem 1模极小化问题的路径跟踪算法 |
| 2. | Constrained minimization problem 约束最小化问题 |
| 3. | This paper presents a solution to the test time minimization problem for core - based systems 本文针对基于芯核系统的测试时间最小化问题提出了一种解决方案。 |
| 4. | With merit function , the origin problem can be conformed to unconstrained or constrained minimization problems 利用merit函数的极小化变形可分为无约束和约束两种类型。 |
| 5. | It is known that the vip can be reformulated as an unconstrained minimization problem through the d - gap function 我们知道,通过广义d -间隙函数,可以将变分不等式问题转化为一个无约束极小化问题。 |
| 6. | When the systems is normal , the stability condition of the observer system is approximated with a minimization problem involving conditions of linear matrix inequalities 假定其可能发生故障,设计了离散状态观测器,对其进行故障检测。 |
| 7. | Finally , prove that any global optimal solution of the converted concave minimization problem or reverse convex programming problem obtained by the existing algorithms is an approximate global optimal solution of the original problem 最后,还证明了得到的凹规划和反凸规划的全局最优解就是原问题的近似全局最优解。 |
| 8. | Similarly , the minimization problem is also transformed into a multiobjective problem by using the other order relations , so by doing the multiobjective problem a solution of the primitive problem can be obtained 而对最小化问题,也可定义区间数之间的另一序关系,同样可把原问题转化为一个多目标问题,通过求此多目标问题得到原问题的解。 |
| 9. | In this chapter , we consider the method of constrained equivalent formulation . we use the merit function based on the restrained ncp function and convert the origin problem ncp ( f ) to minimization problem which constrained on rn + 我们在这一章里就考虑了ncp ( f )的约束极小化变形,通过限制的ncp函数来构造ncp问题的merit函数,将原始的问题ncp ( f )转化为( |
| 10. | In this paper , we consider identifications of physical parameters in the following parabolic initial - boundary value problems . the identification problem is formulated as a constrained minimization problem by using the output least squares approach with the h1 - regularization 作为一个最优控制问题,我们视温度分布v为输出,参数q ( x )为控制,考虑了一类最优控制问题的逆问题。 |