The time precise integration method shows great advantage to solve the stiff equations and nonlinear equations, it provides a new computation way for the research of flexible multibody system.
精细积分法在求解刚性方程和常系数线性方程时显示出很大的优越性,这为柔性体系动力学方程的求解提供了新的工具。
The accurate dynamic analysis of a lot of chemical processes is a large scale problem of solving an array of combined stiff ordinary differential equations.
许多化工过程的精确动态分析计算是一个大规模的刚性常微分方程组的求解问题。
The dynamic equations developed in this paper are a set of highly nonlinear STIFF ordinary differential equations.
本文导出的动力学控制方程是高度非线性的STIFF常微分方程组。
This is a set of typical stiff ordinary differential equations, very small time step could only be adopted when solving the set of equations with common methods.
它是一组典型的刚性常微分方程组,用一般方法求解时只能选用很小的时间步长。
These equations are stiff, but a Gear algorithm can be adapted to it.
该方程组刚性+,可采用吉尔算法求解。
Numerical experiments show that RTFHM is efficient for solving linear and nonlinear non-stiff delay differential equations.
数值试验结果表明,RTFHM对线性和非线性的非刚性延迟微分方程都是有效的。
Since the equations are very stiff and nonlinear, the Runge-Kutta method with a variable step and the Treanor method was used respectively to solve the equations.
针对故障方程组的超强刚性和非线性特性问题, 研究了解决该问题的数学方法。
In this paper, we discuss the error behaviour of hybrid methods for stiff differential equations.
本文讨论刚性微分方程混合方法的误差特性。
In this paper, the general dynamic equations of the hinged stiff rotor blades are derived for a lot of factors, such as the second-harmonic of induced velocity;
在本文中作者考虑了各种因素,推导出铰接式刚性旋翼的动力学广义方程。这些因素是:诱导速度的二阶谐量与挥午系数的二阶谐量;
The formulas are derived for the conditions of concrete blocks absolute-stability and quasi-stability according to the equations of stiff-body motion on plane.
并由刚体平面运动方程,推导出混凝土护坡板的绝对稳定和准稳定条件关系式,以确定护坡板的尺寸。
The formulas are derived for the conditions of concrete blocks absolute-stability and quasi-stability according to the equations of stiff-body motion on plane.
并由刚体平面运动方程,推导出混凝土护坡板的绝对稳定和准稳定条件关系式,以确定护坡板的尺寸。
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