This paper discusses the theoretical models and numerical experiments of parallel iteration methods for solving non-linear differential-algebraic systems.
讨论了非线性微分-代数系统的并行迭代算法所涉及的理论和具体算例的实现。
This paper discusses theoretical models and numerical experiments of waveform relaxation methods for solving nonlinear differential-algebraic systems of index-3.
本文探讨非线性指标- 3微分-代数系统的波形松弛算法所涉及的理论模型和具体算例的求解。
Differential algebraic strategy can be applied to address the dynamic feedback control problems effectively in the nonlinear systems, with Flatness an important concept in the differential algebra.
微分代数采用动态反馈控制实现一类非线性系统的控制,平滑性是微分代数的重要概念。
In this paper, Passive definition of differential algebraic systems and KVP property definition were proposed.
本文提出了微分代数系统无源的定义以及kvp特性的定义。
The standard singular point is an important structure of the differential-algebraic equation systems(DAEs), by which DAEs are differentiated from the ordinary different equation systems (ODEs).
标准奇异点是微分代数方程系统区别于常微分方程系统的一个标志性的拓扑结构,具有重要的理论研究意义。
The equations which describe many trajectory control problems naturally form nonlinear semiexplicit differential algebraic systems.
描述许多轨道控制问题的方程通常构成非线性半显式的微分代数系统。
Similar to methods of differential geometry theory, equivalent theorem between differential algebraic systems passivation and KVP property was used by introducing m derivative.
利用类似微分几何理论的方法,通过引入微分代数系统的m导数,利用微分代数系统无源性定义以及kvp特性的等价定理。
This Paper investigates the characteristic estimation of meromorphic solutions of a class of systems of complex algebraic differential equations.
本文给出了一类复代数微分程组亚纯解的特征估计。
The differential-algebraic equations are often chosen as the mathematical models of the dynamics of multibody systems in order to achieve the numerical emulation for the multibody systems.
多体系统进行数值仿真时,很多选择了微分代数混合方程作为多体系统动力学数学模型。
The differential-algebraic equations are often chosen as the mathematical models of the dynamics of multibody systems in order to achieve the numerical emulation for the multibody systems.
多体系统进行数值仿真时,很多选择了微分代数混合方程作为多体系统动力学数学模型。
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