线性微分方程组可以应用线性代数中的方法求解。
Systems of linear differential equations can be handled by using the methods of linear algebra.
用代数动力学方法求得了用泰勒级数表示的局域收敛的常微分方程的精确解。
By algebraic dynamical method, the exact analytical solutions of the ordinary differential equations are obtained in terms of Taylor series with local convergent radius.
本文采用的研究方法有矩阵方法,代数方法和微分几何理论。
The methods used in this dissertation include matrix, algebra as well as differential geometry theory.
由于在微分学中引进了代数概念,使许多难于理解的概念和证明方法都变得简单。
The introduction of the concepts in algebra makes simple many concepts and verifications which have been difficult.
该方法把结构振动的微分方程转化为振幅与频率的代数方程,并给出了流体力系数的经验公式。
The method transfers the structural vibration differential equations into algebraic equations and the empirical formulae about fluid force coefficients is put forward.
将连接与阻尼分配?无源控制方法进行从常微分方程到微分代数方程的拓展,求解一类仿射非线性微分代数系统的调节问题。
The interconnection and damping assignment passivity-based control (IDA-PBC) methodology is extended to solve the regulation problem of affine nonlinear differential algebraic system.
提出一种求解非线性代数方程和非线性常微分方程的新方法。
A new approach for solution of nonlinear algebraic and differential equation sets was presented.
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。
Similar to methods of differential geometry theory, equivalent theorem between differential algebraic systems passivation and KVP property was used by introducing m derivative.
用这种方法,微分方程将变为一组代数方程.它们很容易求解。最后给出了一数值例子。
Using this method, the differential equation will be developed into a series of algebraic equations. and they are ea…
用这种方法,微分方程将变为一组代数方程.它们很容易求解。最后给出了一数值例子。
Using this method, the differential equation will be developed into a series of algebraic equations. and they are ea…
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