搜索资源列表
changweifenfangchengshuzhijie
- 自编常微分方程初值问题的常用算法,包括折线法、改进欧拉法、4阶龙格-库塔法-Self-compiled initial value problems of ordinary differential equations commonly used algorithms, including the broken line method, improved Euler' s method, 4-order Runge- Kutta method
jisuanfangfa
- 计算方法的七个典型程序。全部都有。拉格朗日插值.cpp 二分法.cpp 高斯.cpp 高斯-赛德尔.cpp 龙贝格.cpp 龙格库塔.cpp 牛顿迭代.c-Method of calculation of the seven typical program. All of them. Lagrange interpolation. Cpp dichotomy. Cpp Gaussian. Cpp Gauss- Seidel. Cpp Rhomberg. Cpp Runge-Kutta. Cpp
marungemaspline
- 4阶经典龙格库塔格式解常微分方程y =f(x, y), y(x0)=y0 marunge4 用途:三阶样条插值(一阶导数边界条件)maspline-w
GRKT10
- 最常用的四阶龙格—库塔法求解一阶常微分方程的C语言实现方法-The most commonly used fourth-order Runge- Kutta method for solving a first-order ordinary differential equations of the C language implementation method
Runge_Kutta
- 这是大学数值分析的实验——龙格库塔格算法的源码,帮助大家学习和掌握龙格库塔算法!-This is the University analysis of the experiment- Long Gekutage algorithm source code, to help you learn and master the Runge-Kutta algorithm!
differentialequations
- 本源码为原创代码。包含分别用改进欧拉方法、龙格-库塔法、阿当母斯法求解形如y =f(x,y)的常微分方程的源代码。希望对用到数值计算算法的起帮助作用。-The source for the original code. Included were the improved Euler method, Runge- Kutta method, Adam mother there method of the form y ' = f (x, y) of ordinary differentia
sijielonggekutafajieyijiechangweifenfangcheng
- 本程序是用Visual Biasic 实现用四阶龙格-库塔方法对一阶常微分方程(其通式为dy/dx=m-qx(m,q为常数))求解,并用点表示出各函数值在坐标轴上的位置。 龙格-库塔(Runge-Kutta)方法是一种高精度的单步法,比欧拉格式更精确,它采用了间接使用泰勒级数的技术。他既保留了泰勒公式的精度高的特点又避免过多的计算导数值。他是有泰勒公式推倒出的,因此它要求所求的解应具有较好的光滑性。 坐标表示其位置,这样可以直观的看出不用微分方程解的位置以及它们的联系。 -This
stochasticresonance
- 随机过程的改进代码,使用龙格-库塔算法计算输出信号和输出功率谱,研究双稳态系统必备.-Random process of improving the code, using the Runge- Kutta algorithm to calculate the output signal and the output power spectrum of bistable systems essential.
LGKT4
- 四阶龙格库塔法解一阶二元微分方程 应用于数值计算-Fourth-order Runge-Kutta method for solving a class of binary differential equations for numerical calculation
hundunxitong
- 给予MATLAB的四阶龙格库塔解混沌系统-To the fourth order Runge-Kutta MATLAB Solution of chaotic systems
89346499sr
- 产生随机共振现象的输入输出信噪比曲线,运用龙格库塔算法求解朗之万方程,进而实现随机共振系统-the realization of stochastic resonance systems
rk4
- 改进的四阶龙格库塔算法,Improved fourth-order Runge-Kutta algorithm另带独立分量法程序-Improved fourth-order Runge-Kutta algorithm
function
- 一个函数的编写,实现四阶龙格-库塔方法解高阶微分方程组的初值问题 -Write a function to achieve fourth-order Runge- Kutta method for solving the initial value problem of higher order differential equations
suanfa
- 数值解与理论解对比可知,四阶龙格-库塔法的精度已经很高,用它来解一般常微分方程已经足够了。-Numerical comparison shows that the theoretical solutions, Runge- Kutta method has high accuracy, and use it to solve ordinary differential equations general enough.
keshe1ode4
- 四阶龙格—库塔算法。自己在课程设计中就是用的这个算法。对于初学者有一定的帮助-Fourth order Runge- Kutta method. Own course design is to use this algorithm. Be helpful for beginners
runge-kutta
- 四阶龙格-库塔法求微分方程,通过实数编码方法实现简单易懂--Runge- Kutta Method to solve derivative Equations
四阶龙格库塔法解振荡方程VC++实现及画图
- 四阶龙格库塔法解振荡方程VC++实现及画图,一般使用VB编写不能画图,此程序经过改进能很好拟合。
捷联惯导的matlab仿真.doc
- 导航系统中的捷联惯导,基于龙格库塔法和四元数法求解器位置和姿态,并求出其误差函数
龙哥库塔-c语言
- 用c语言编写的龙哥库塔方法求解微分方程组,N代表积分变量的个数,step-积分步长。
被动调Q速率方程组仿真
- 基于Nd:YAG/Cr4:YAG的半导体激光器被动调Q ,速率方程组仿真(经典四阶龙格库塔法)。(the rate equation simulation of Nd:YAG/Cr4:YAG passively Q-switched solid laser.)