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numeriacal-analysis-matlab-code
- 数值分析中matlab源码,包括方程求解,数值积分,数值微分,微分方程解法等-Numerical analysis matlab source code, including equations, numerical integration, numerical differentiation, Differential Equation
numerical-solutions
- 常微分方程初值问题的数值解的四种方法:RK4,AB4,AB4-AM4,改进的AB4-AM4-numerical solutions to initial value problems in ordinary differential equations.RK4,AB4,AB4-AM4,improvedAB4-AM4
RK_4
- C语言实现四阶龙格—库塔公式,可用于常微分方程的数值计算-C language Runge- Kutta formula can be used for the numerical calculation of ordinary differential equations
Differential-Equations-in-Maple
- 用maple编写的,在maple12运行环境下测试通过。 专门针对 微分方程的解法的数学工具。-Written with maple, in maple12 runtime environment under test through. Specifically for Differential Equations and mathematical tools.
rk_ode
- C++ 编程用龙哥库塔方法解常微分方程,不同区间,不同初始值-C++ programming solution of ordinary differential the Long Ge Kuta method, different intervals, different initial values
ODE-problem
- 使用AB4和AK4方法求解常微分方程初值问题-solve initial value problem of ordinary differential equation (ODE)using AB4 and AK4 method
classical-algorithm-for--C
- 包含常用的数值计算方法,插值、寻找、拟合、方程组求解、微分方程求解等-Contains commonly used numerical methods, interpolation, looking fit, solving equations, differential equation solving
rkf
- Runge-kutta-Fehlberg法求解一阶非线性常微分方程-Runge-kutta-Fehlberg method to solve first-order nonlinear ordinary differential equations
numerical-methods
- 数值方法的5个重要的算法: 1.[Dirich.m] 求解拉普拉斯方程的狄利克雷方法. 用于偏微分方程的数值解 2.[Hamming.m] 汉明方法是用来修正微分方程的多步预测。 3. [Milne.m] 米尔恩 - 辛普森差分方程求解方法,用于预测校正方法。 4. [Rkf45.m]龙格 - 库塔 - 沃尔伯格错误控制和步骤的方法求解微分方程的近似解 5.[Romber.m]著名的龙贝格积分源代码。计算结果存在并显示为下三角矩阵。-Numerical Methods in
myfun
- 有关偏微分方程求解,利用pde工具箱来求解-Partial differential equations using the the pde toolbox to solving
chapter1
- 微分方程数值求解中的单步法的具体是实现,其中包括欧拉单步法。有具体的例子,希望可以帮助大家-Specific single step in the numerical solution of differential equations, including Euler single step. Specific examples, we hope to help
bvp4c2
- matlab求解高阶偏微分方程边界问题,包括bvp4c.m,license.txt和-matlab solving warned partial differential equations of the border issue, bvp4c,sparse2.mexw32
RungeKutta
- 求解常微分方程的RungeKutta法的matlab程序-matlab code about RungeKutta
Runge_Kutta
- 龙格-库塔算法 - 常微分方程的数值解法-Runge- Kutta algorithm- the numerical solution of ordinary differential equations
Gaussmethod
- 高斯法解微分方程,研究生数值分析课研究内容-Gauss method for solving differential equations, Graduate numerical analysis course contents
RK4
- RK4演算法,可用於解決線性及非線性微分方程-RK4 algorithm can be used to solve linear and non-linear differential equations
The-numerical-solution-of-SDE
- 特殊微分方程的数值解法,刚性微分方程,延迟微分方程-The numerical solution of special differential equation
1
- 利用有限差分法解边值问题时,首先将求解区域分为很多个网格和节点,并用差商代替微商,然后,使区域中的偏微分方程转化为以节点的数值为未知量的差分方程组,最后,解该方程组便可得到各离散点待求的数值解-Using the finite difference method for solving boundary value problem, the solution region is divided into many grid nodes, instead of the derivative wit
numerical-methods
- 本程序用C语言实现了微分方程求解,使用了梯形法、矩形法和辛普森法-This program with C language differential equation solving, using the trapezoidal method, rectangular and Simpson
part-num
- 本程序用matlab语言实现了偏微分方程数值解法的测试问题-The procedures used Matlab language test of the numerical solution of partial differential equations