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daba
- 用四阶龙格库塔法解决常微分方程边值问题,具体来说就是打靶问题-The fourth-order Runge-Kutta method to solve ordinary differential equations, specifically targeting the problem
nlineshoot
- 打靶法计算非线性方程,只需要修改方程的参数即可进一步通过打靶法求解,很实用-Calculation shooting method of nonlinear equations, only need to modify the parameters of the equation can be further illustrated by the shooting method to solve, very practical
Shootmethod
- 打靶法解算微分方程,该方程可以解算再一直终点状态的情况下解算微分方程-The shooting method solution of differential equation
2fmincon
- 用打靶法求解小车运动轨迹,求解非线性问题-solve the car s track by the shooting method
xianxingdabafa
- 利用线性打靶法计算变系数的微分方程,并画图-The second- order differential equation with variable coefficient is solved by linear target method, and the content is detailed
project_homework_sqp
- matlab直接打靶法,适用于最优控制。解决小车定点停车问题。(Matlab direct shooting method, applied to the optimal control.Solve the problem of car parking)
shoot
- 试用打靶法求二阶非线性常微分方程两点边值的数值解,用Matlab编程计算,并给出一些例子,验证你的算法与程序的正确性。(shooting method for two order nonlinear ordinary differential equations)
matlab 常微分方程数值解法 源程序代码
- 11.1 Euler方法 380 11.1.1 Euler公式的推导 380 11.1.2 Euler方法的改进 383 11.2 Runge-Kutta方法 385 11.2.1 二阶Runge-Kutta方法 385 11.2.2 三阶Runge-Kutta方法 388 11.2.3 四阶Runge-Kutta方法 390 11.2.4 隐式Runge-Kutta方法 391 11.3