接下来要讲到的,就是你们可能听说过的拉格朗日乘数法。
And so what we will see is you may have heard of Lagrange multipliers.
其中一个是找出一个函数的极小值,极大值,这个函数的变量是相关的,这种方法称为拉格朗日乘数法。
One of them is to find the minimum of a maximum of a function when the variables are not independent, and that is the method of Lagrange multipliers.
有一个极值问题,也有关于拉格朗日乘数法的,链式法则也会有的,约束条件下偏导数当然不会漏掉。
Expect one about a min/max problem, something about Lagrange multipliers, something about the chain rule and something about constrained partial derivatives.
现在我们来用拉格朗日乘数法方程。
我们就此学过拉格朗日乘数法的。
应用拉格朗日乘数法,将空闲时间分布到数据通路的各个操作节点上,从而有效地降低了设计电路的能耗。
By means of Lagrange multiplier method, this method distributes the slack to the operator nodes in the data path, thus, efficiently reduces the energy consumption of design circuit.
然后利用拉格朗日乘数法与隐函数定理,求出了使其中一不等式局部反向的临界值。
Furthermore, utilizing the Lagrange method of multipliers and the implicit theorem to work out the critical value which makes one of those inequality locally inverted.
运用拉格朗日乘数法,以最大制冷量为优化目标,对该系统进行了优化,得到最大制冷量的一般表达式。
Applying the method of Lagrange multiplier, the system is optimized for maximum cooling rate and gets the rate general expression.
借助拉格朗日乘数法建立增广的目标函数,提出等耗量微增率准则及静态锅炉模型辨识方法,对耗量函数的性质给出了凸性要求。
An enhanced target function is built up via Lagrange multiplier and the principle of equal mini rate of consumption increasement and the method of static boiler model analysis are put forward.
对最适化条件、拉格朗日乘数理论以及对偶理论的综合论述,以及在控制、通信、动力系统和资源分配问题上的应用。
Comprehensive treatment of optimality conditions, Lagrange multiplier theory, and duality theory. Applications drawn from control, communications, power systems, and resource allocation problems.
对最适化条件、拉格朗日乘数理论以及对偶理论的综合论述,以及在控制、通信、动力系统和资源分配问题上的应用。
Comprehensive treatment of optimality conditions, Lagrange multiplier theory, and duality theory. Applications drawn from control, communications, power systems, and resource allocation problems.
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