路径规划可以描述为泛函极值模型。
A functional minimization model can be derived from a path planning.
并推导出一种判断裂缝位置的泛函分析法。
A functional analysis method to determine the position of a crack is proposed.
对偶不变性结果是泛函分析空间理论的核心内容。
Duality invariance is the core of the space theory of functional analysis.
最后,我们又证得了几族李雅普·诺夫泛函的存在性。
Finally, we prove the existence of several families of Lyapunov functionals.
反应能量主要采用原子团加和方法以及密度泛函理论进行估算。
Reaction energy was always estimated by Group additivity method and density functional theory.
通过泛函的极小化计算得到相关参数,并进行加权分析得到相关曲面。
Meanwhile we wight the functional and analysis it to get a correlative surface.
通过泛函的极小化计算得到相关参数,并进行加权分析得到相关曲面。
Meanwhile we wight the functional and analysis it to get a correlative surface.
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