How to solve this system of ODEs?

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Jaydev Singh Rao 2020 年 12 月 25 日

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回答済み: Milan Padhiyar 2020 年 12 月 28 日

I was try to study a dynamical system and for that after accounting for all factor I got the following system of differential equations:

[1]

and,

[2]

where c is a constant.

I want to find a solution to these differential equations. Is it possible to find an analytical or numerical solution of these equations using matlab. If so how?

I not very much familiar with the procedure for solving differential equations using matlab.

Thanks!

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James Tursa 2020 年 12 月 26 日

Do you have initial conditions for x, y, and dy/dt? If so, you could rewrite your equations as a system of three 1st order equations and use ode45( ) to find a numerical solution.

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Answer 1

Milan Padhiyar 2020 年 12 月 28 日

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Hello Jaydev,

We can solve the coupled ODE system by using ‘ode45’ in MATLAB. This function requires arguments as first-order ODE equations, time, and initial conditions. By looking into your equation, the state vector of this system will be [x, y, y_dot], where y_dot is the derivative of y with respect to t.

So you need to rewrite both equations in a form of a column vector consisting of first-order ODEs. The LHS of column vector should look like [x_dot, y_dot, y_ddot], where x_dot and y_dot are derivative of x and y with respect to t respectively, and y_ddot is derivative of y with respect to t.

Please refer to the below link for the examples on ‘ode45’.

https://www.mathworks.com/help/matlab/ref/ode45.html

Thank You!