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Aumerical_Analysis_MATLAB_function
- 研一刚上完数值分析,自己写了几个算法的子函数,可以直接调用,参数的含意在文件中有说明,这五个算法分别是:拉格朗日插值,hermite插值,Newton插值,修正hamming算法,龙贝格加速算法。希望能够对大家有所帮助。-Kenichi just finished numerical analysis, himself wrote a number of algorithms Functions, you can directly call the meaning of the paramete
longgexianxiang
- 数值计算方法 龙格现象+解决(切比雪夫点的定义)-Numerical method Runge phenomenon+ Solution (Chebyshev point definition)
p2
- c语言实现定步长四阶龙格-库塔,可以自己对函数进行修改,希望大家喜欢-c language to achieve fourth-order fixed-step Runge- Kutta, can be modified to function, I hope you like
LongGe
- 这是一个龙格库塔算法计算的源代码,写得很好,很容易嵌入到自己的用户程序中-This is a Runge-Kutta algorithm of the source code, was very well written, it is easy to embed into their own user programs in
fit
- 用差分方程或数值微分解决简单的实际问题。 实验3 插值与数值积分 l 插值问题提法和求解思路 l Lagrange插值的原理和优缺点 l 分段线性和三次样条插值的原理和优缺点 l 用MATLAB实现分段线性和三次样条插值 l 梯形、辛普森积分公式的原理及MATLAB实现 l 数值积分公式的误差——收敛阶的概念 l 高斯积分公式 l 广义积分与多重积分 l 用插值和数值积分解决
GRKT10
- 龙格-库塔法,数值分析中求解微分方程的方法。-Runge- Kutta method, numerical analysis methods for solving differential equations.
longbeige
- 实现了龙贝格算法,-langberg
C
- 这个是龙格库塔求解微分方程数值解,用C++编写的-This is a Runge-Kutta numerical solution of differential equations to solve, using C++ to prepare the
Ruk4
- 四阶龙格库达法求解微分方程组,数学计算常用的工具方法-Fourth-order Runge Treasury method of differential equations, mathematical tools commonly used method of calculation
Runge-Kutta
- 在C++环境下,实现用四阶龙格库塔方法解方程组。-In C++ environment, using fourth-order Runge-Kutta method to solve equations.
chaos-simulate
- Flash制作的混沌仿真程序,用四阶龙格库塔算法画出了洛伦兹吸引子,动态显示-Chaos Flash simulation program produced by fourth-order Runge-Kutta algorithm to draw the Lorenz attractor, dynamic display
RK
- 龙格库塔程序源代码,用于解微分方程或微分方程组,给初学者作为参考。-Runge-Kutta program source code for the solution of differential equations or differential equations, as a reference for beginners.
RK
- 龙格库塔法方法的全面介绍。不同龙格库塔法方法,获取不同精度计算结果-Runge-Kutta method of a comprehensive approach. Different methods of Runge-Kutta method to obtain different results accuracy
6Runge-Kutta
- 龙格库塔法解数值积分,如需修改函数可以直接在函数部分修改-Runge-Kutta method of numerical integration solution, for modified function can be modified directly in the function part
ode
- 基于龙格库塔算法的矩阵微分方程组求解子程序-Runge-Kutta algorithm based on the matrix differential equation solving subroutine
changdu
- 利用龙格库塔法解光波导激光器的重叠因子的传输方程,从而得到输出功率-Runge-Kutta method using optical waveguide laser solutions overlap factor of the transfer equation, thus the output power
rkc
- 四阶龙格库塔方法的c++语言编程,可以求解精度较高。-Fourth-order Runge-Kutta methods c++ language programming, you can solve the high accuracy.
longgebei
- 龙格贝塔算法-Long格贝塔algorithm
ccailiaonew
- HH模型 神经元放电 龙格库塔算法 神经元激发行为-HH model neurons Runge-Kutta algorithm
shuzhifenxikechengsheji
- 考虑在一个固定区间上用插值逼近一个函数。显然,Lagrange插值中使用的节点越多,插值多项式的次数就越高。我们自然关心插值多项式增加时,Ln(x)是否也更加靠近被逼近的函数。龙格(Runge)给出的一个例子是极著名并富有启发性-Consider a fixed-interval interpolation using a function approximation. Obviously, Lagrange interpolation nodes are used the more the n