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常微分方程(组)求解.rar
- 给出计算常微分方程(组)的各种算法的使用示例。
龙格库塔求解微分方程数值解
- 龙格库塔求解微分方程数值解-Runge - Kutta numerical solution of differential equations solved
用四阶龙格-库塔法解求解微分方程初值问题
- 典型的数值分析程序,用四阶龙格-库塔法求解微分方程初值问题-typical numerical analysis procedures, with four bands Runge - Kutta method to solve initial value problems
实验6-牛顿法解方程
- 在matlab中应用牛顿切线法和割线法求解一元多次方程。具体详见压缩包中说明文档。-Apply Newton tangent and secant method to solve unitary multiple order functions in matlab. Please read the readme document in the zip file.
VC实现常微分方程初值问题求解
- 讲述如何利用VC的编程来求解微分方程的一种思想-VC on how to use the programming to solve a differential equation thinking
解高次幂方程12
- 由于对两次以上的高次函数求解比较不方便 本程序将为你提供便捷-due to more than two high-function solution more inconvenient this program will provide you with convenient
para
- 抛物线法求解 方程的构造方法:给出[0,1]区间上的随机数(服从均匀分布)作为方程的根p*. 设你的班级数为a3,学号的后两位数分别为a2与a1,从而得到你的三次方程 例如:你的31班的12号,则你的方程是21x3+60x2+2x+a0=0的形式. 方程中的系数a0由你得到的根p*来确定. -parabolic equation method Construction Methods : given interval [0,1] on the random numbe
hypot
- 抛物线法求解 方程的构造方法:给出[0,1]区间上的随机数(服从均匀分布)作为方程的根p*. 设你的班级数为a3,学号的后两位数分别为a2与a1,从而得到你的三次方程 例如:你的31班的12号,则你的方程是21x3+60x2+2x+a0=0的形式. 方程中的系数a0由你得到的根p*来确定. -parabolic equation method Construction Methods : given interval [0,1] on the random numbe
线性方程组求解与方程组性态讨论
- 线性方程组求解与方程组性态讨论(实验报告)三次样条插值问题,数值积分,微分方程数值解,线性方程组的迭代解法,非线性方程的迭代解法-solving linear equations and the equations behavior discussion (Experiment), cubic spline interpolation, numerical integration, the numerical solution of differential equations, linear
四种差分方法求微分方程
- 差分法求解微分方程:古典显式法,收敛性最差;古典隐式法;Crank-Nicolson法,收敛性最好-difference method to solve the differential equation : Explicit classical method, the worst convergence; Classical implicit; Crank-Nicolson, the best convergence
求解非线性方程组
- 求解定位方程组。并直接利用三元方程求出X,Y,Z时的误差子函数-positioning Solving equations. 3 yuan and the direct use of equations derived X, Y, Z of error Functions
superlu_ug.ps
- 数值计算,矩阵分解,可以把稀疏矩阵分解,以达到求解方程的目的-numerical calculation, matrix decomposition, can be sparse matrix decomposition, in order to achieve the purpose of solving equations
mm
- 雅可比迭代求解方程 用雅可比迭代计算一个线性方程组。用户只需要输入系数矩阵和常数矩阵就可以-Jacobi iteration equation Jacobian an iterative calculation of linear equations. Users only need to input matrix and constant coefficient matrix can
龙格库塔求解微分方程数值解
- 龙格库塔求解微分方程数值解,非常有用的解题方法,一定会用到-Runge - Kutta numerical solution of differential equations to solve, a very useful method of solving problems, we will use
光孤子传播过程 非线性薛定谔方程
- 本模拟是采用分步傅里叶的解,求光孤子在光线内传输过程数值求解薛定谔方程。方程是激光器在光纤中传输的过程。(In this simulation, the fractional Fourier solution is used to solve the Schrodinger equation. The equation is the process of laser transmission in fiber.)
振动方程求解程序
- 此程序可求解二阶微分方程振动的时域图和频域图,计算精准。(This program can solve the time domain and frequency domain of the second order differential equation vibration, and the calculation is accurate.)
椭圆型偏微分方程生成O型网格
- 基于椭圆型偏微分方程生成二维NACA0012翼型的O型网格并求解流场(Generation of O-grid of two-dimensional NACA0012 airfoil and solution of flow field based on elliptic partial differential equation)
有限元法求解Fokker-Planck方程
- 适用于求解ut-▽(a(x,y)▽u)=f(x,y)的零初边值问题(Applicable to the problem of zero initial boundary value of a kind of PDE)
Godunov格式和Roe格式求解Burgers方程
- Godunov格式和Roe格式求解Burgers方程(Godunov scheme and Roe scheme for solving Burgers equation)
基于Laplace方程的翼型O-形网格生成器
- 源程序使用C++编写,通过求解椭圆型微分方程(拉普拉斯方程)生成绕翼型的O-形二维网格。网格坐标以.plt的格式输出,可使用tecplot进行查看。