在本文中,我们考虑非线性不等式约束优化问题。
In this paper, we consider the nonlinear inequality constrained optimization problems.
中心是一个满足弱线性不等式的合集,因此它是封闭的、凸的。
The core is a set which satisfies a system of weak linear inequalities, so it is closed and convex.
讨论了非线性不等式和等式约束优化问题在退化情形下的求解方法。
This paper discusses optimization with nonlinear equality and inequality constraints under degeneracy.
本文给出非线性不等式约束最优化问题的一个初始点可任取的算法。
This paper presents an algorithm for nonlinear inequality constrained optimization problems which begins at any starting point.
对满足一类新的含反常积分非线性不等式的有界函数建立了先验逐点估计。
Apriori point-wise estimations are established for bounded functions satisfying a new class of nonlinear inequalities involving improper integrals.
使用仿射变换内点回代技术的信赖域子空间算法解线性不等式约束的非线性优化问题。
We present an affine scaling trust region algorithm with interior back - tracking and subspace techniques for nonlinear optimizations subject to linear inequality constraints.
提出了一种加入线性不等式约束的卡尔曼滤波方法,并用于涡扇发动机的健康状况估计。
A method for incorporating linear state inequality constraints in a Kalman filter is proposed and applied to turbofan engine health estimation.
运用多项式稳定性充分判据,将线性系统的同时镇定问题转化成非线性不等式组的求解。
In this paper, the simultaneous stabilization problem of linear systems is transformed into solving problems of a set of nonlinear inequalities by using a sufficient criterion of polynomial stability.
从而使问题转化成求解二元线性不等式组的问题,为此可方便地借助计算机求出最佳结果。
The problem is changed to solving the linear inequality group with two unknown, thus, we can get the optimal solution by the computer.
对一类带有非负边界约束的线性不等式约束优化问题进行了研究,提出了一种新的信赖域算法。
We propose a new trust region algorithm for special linear inequality constrained optimization problems with nonnegative bound constraints.
它在理论上是多项式算法,并可以从任意点启动,可以应用共轭梯度方法有效地求解大规模线性不等式组问题。
SDNM is a polynomial time algorithm with the Newtons method, so that SDNM can solve large-scale linear inequalities.
对非线性不等式约束最优化问题进行了讨论,借助广义投影建立求解问题的一个含系列自由参数的统一算法模型。
Optimization problem with nonlinear inequality constraints is discussed. With the help of the generalized projection, a unified algorithm model with a series of free parameters is presented.
采用引进具有二阶连续可微的辅助函数,将非线性不等式组转化为非线性方程组,然后利用牛顿迭代法对非线性方程组进行求解。
In is established the equivalence between the nonlinear inequalities with nonlinear equations by using auxiliary function, a descended Newton algorithm is proposed.
所运用的线性不等式组的一种旋转算法避免了通常处理二次规划问题所需的松弛变量、剩余变量和人工变量,操作简便、计算效率高。
The algorithm solves the quadric programming problem without adding slack, remaining and artificial variables while its efficiency is very high and it operates very easily.
本文将非线性不等式约束下的非线性数学规划理论引入到水平井待钻井眼轨迹设计中,提出了水平井待钻井眼轨迹的最优化设计方法。
The paper introduces the nonlinear programming method under nonlinear constraints to well trajectory design while drilling and puts forward an optimization method for well trajectory design.
基于线性矩阵不等式(LMI)的方法,将故障检测问题转化为系统鲁棒稳定性的分析问题。
Based on the linear matrix inequality (LMI) approach, the system fault diagnosis problem can be solved by using the systems robust stability analysis method.
特种变压器电磁参数的优化设计是一个带有等式和不等式约束,满足某种设计目标的非线性规划问题。
Optimization mathematical model of special transformer electromagnetism parameters is a nonlinear programming problem with equality and inequality constraints, to meet some certain design objective.
本文研究了出现在系统与控制理论中的一些标准的、包含线性矩阵不等式的凸优化问题。
This paper discusses problems arising in system and control theory to a few standard convex optimization problems involving linear matrix inequality (LMI).
第四章主要介绍了两类矩阵不等式及其在线性统计中的应用。
In chapter four, we mainly introduce the two types of matrix inequalities and their applications in statistics.
为提高动态系统的性能,提出了一种基于线性矩阵不等式技术的鲁棒输出反馈控制器设计方法。
To enhance the performance of dynamic systems, a design method of robust output-feedback controller based on the linear matrix inequality technique was proposed.
满意控制器设计可以完全转化为线性矩阵不等式的求解问题,不需要人工干预选择参数。
The satisfactory controller design problem can be completely transformed to solution of the LMIs without manual intervening in choosing parameters.
代数的比重则会增加,考生要在线性方程、不等式、二元方程等方面做好准备。
Algebra is stepping up: Prepare for linear equations and inequalities, and systems of equations in two variables.
本文针对离散区间2 - D系统的二次稳定性问题,给出了线性矩阵不等式形式的判定条件。
This paper presents a condition in terms of linear matrix inequalities (LMIs) for the quadratic stability of discrete-time interval 2-d systems.
给出了线性矩阵不等式形式的稳定滑动模面存在的充分条件。
The sufficient condition for the existence of stable sliding surface was derived in terms of LMIs.
方法线性矩阵不等式方法。
最后通过线性参变控制,获得了用有限维数线性矩阵不等式描述的充分条件。
A sufficient condition is obtained using finite dimension linear matrix inequalities (LMI) describing by linear (parameter-variety) control.
最后通过线性参变控制,获得了用有限维数线性矩阵不等式描述的充分条件。
A sufficient condition is obtained using finite dimension linear matrix inequalities (LMI) describing by linear (parameter-variety) control.
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