非线性方程的比较定理。
构造了一个改进的非线性方程求解的迭代格式。
An improved iteration method solving nonlinear equation is constructed.
为此,需求解一个在给定边界条件下的非线性方程。
For the above case, a nonlinear equation and corresponding boundary conditions are given.
首先,概述有限元接触理论及求解非线性方程的方法。
Firstly, the contact theory and the method of solving nonlinear equations are summarized.
决定自动增益控制系统静态特性的是一组非线性方程。
The static characteristic of an automatic gain control system depends on a set of nonlinear equations.
这些方法和结果已成功的应用于各类非线性方程的求解。
These methods and results have been successfully applied to various of nonlinear equations.
光学双稳态的调制函数和反馈函数构成一组非线性方程。
Bistable optical devices modulating function and clectro- optical feedback function are a group of non- linear equation.
这样,主缆吊点坐标计算最终被转换成求解一个非线性方程。
Thus through solving a nonlinear equation, the coordinates of hanging points can be obtained.
一般地说,从这些准则出发得到的正则方程均为非线性方程。
Generally speaking, the regular equations obtained using these criteria are nonlinear equations.
因接触区的边界预先不能定出,故这组方程为弱非线性方程。
Because the boundary of contact region cannot be determined in advance, these equations are weak nonlinear ones.
本文针对一类非线性方程,构造了一种求其分支解的迭代方法。
An iteration method on bifurcation solutions of following nonlinear equations is constructed.
本文提出一种通过对数复变换求非线性方程实数根数值解的方法。
A method to find real numerical solution of the nonlinear equation by logarithm complex conversion is presented in this paper.
应用非线性方程的定性分析理论,获得双星演化的非线性动力学机制。
Then by using the qualitative analysis theory of nonlinear equation, a nonlinear dynamical mechanism of formation of binary stars is obtained.
非线性方程采用位移引导或弧长引导的牛顿-拉夫森增量迭代法求解。
Newton Raphson method is used to solve the non linear equations piloted in displacements or in arc length.
方程是阿尔奇方程在泥质砂岩地层中的推广,W-S方程为非线性方程。
WaxmanSmits (WS) equation is an evolution of Acrhie equation for shaly sands, and it is a nonlinear equation.
本文提出了一类含积分的非线性方程的数值算法,并讨论了算法的收敛性。
In this paper, we introduce the numerical solution of nonlinear equation with a integration and discuss the convergence of algorithm.
曲梁的非线性方程与薄壁开口截面拱的稳定承载力是本文探讨的两大主题。
This dissertation focused on the nonlinear equations and stability capability of open thin-walled circular arches.
在对复杂的非线性方程进行回归分析时,提出了一种简单的迭代分析方法。
A simple iteration method is proposed for the complex nonlinear (regression) analysis of heat transfer data.
水胶比小于0.4的混凝土其自身相对湿度变化规律可用非线性方程表征。
The ARH change laws of concrete with water to binder ratio lower than 0.4 can be expressed with a non-linear equation.
引入双参数变换求出了一个非线性方程的显示孤波解,方法简便,便于应用。
By introducing double parameter transformation, the explicit solitary wave solutions for a nonlinear equation are obtained.
不动点迭代方法是求解非线性方程近似根的一个重要方法,其应用非常广泛。
Fixed-Point Iteration method is an important technique to solve nonlinear equations for calculating approximate roots and applied widely.
在实际应用中,很多问题出现的方程都是奇异非线性方程,如分歧点、折点等。
Many equations arising in practical application are singular nonlinear equations, such as bifurcation points, inflexion etc.
提出了一个新的迭代公式,用此公式求解非线性方程根收敛速度快,且绝对收敛。
This paper presents a new iterative formula by which the solution of nonlinear equation had rapid and absolute convergence.
求解开普勒方程可用逐次逼近法,这种方法还可推广到非线性方程的求解问题中。
Kepler s equations can be solved with the gradual approach, which can be further extended to the solution of the non-linear equations.
许多描述保守或耗散系统的非线性方程,在一定的参数范围内表现出内在的随机性。
Many nonlinear equations, describing either conservative or dissipative systems, show stochastic behaviour in suitable range of parameter values.
本文给出一个求非线性方程实根的迭代公式,证明了由此产生的迭代叙列的收敛性。
This paper proposes a iterative formula for solution to real roots of nonlinear equations, proves convergence of the iterative series.
运用变分的方法将遥感水汽的非线性方程线性化,讨论了线性化遥感方程的适用范围。
The nonlinear equation for remote sensing of water vapor was linearized by means of variation method. The effective range of linearized equation is examined.
系统地研究了来自于射影几何中平面曲线运动的1 + 1维非线性方程的对称代数。
The symmetry algebras of 1 + 1 dimensional nonlinear evolution equation arising from the motion of plane curve in affine geometry are systematically studied.
系统地研究了来自于射影几何中平面曲线运动的1 + 1维非线性方程的对称代数。
The symmetry algebras of 1 + 1 dimensional nonlinear evolution equation arising from the motion of plane curve in affine geometry are systematically studied.
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