Need help while defining ode function for bvp4c/bvp5c/ode45 solve

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Md Sojib am 6 Jun. 2024

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Kommentiert: Torsten am 6 Jun. 2024

I wanted to define system of ode functions for my higher order problems. I have differential equations are :

x=cosy

z=siny

y'=sqrt((lambda*f*p*siny/x)+(siny^2/x^2)-(2/lambda^2)+(2*cosy/lambda)-(3*a*p^2*lambda^2/2))

y"=(-y'*x'/lambda*x)-(cosy/x)-(f*p'/4)-(f*x'*p/4*x)+(y'*cosy/x)+(siny/lambda)+(lambda*f*p*cosy/4*x)+(siny*cosy/x^2)+(mu_1*(sin(y) - mu_2*cos(y)) / (2 * x^2)

where, y,x,p are functions of s. and f,lambda and a are constants.

while defining ode function for my bvp solve, I write the code as

function dydx = odefun2(t, y, params)

lambda = params.lambda;

a = params.a;

f = params.f;

mu_1=params.mu_1;

mu_2=params.mu_2;

y1 = y(1); % y

y2 = y(2); % x

y3 = y(3); % z

y4 = y(4); % p

y5 = y(5); % p_dot

y6 = cos(y1); %x_dot

y7 = sin(y1); %z_dot

ydot = sqrt((lambda * f * y4 * sin(y1) / y2) + (sin(y1)^2 / y2^2) - (2 / lambda^2) + (2 * cos(y1) / lambda) - (3 * a * (y4^2) * lambda^2)/2);

yddot = -((ydot * cos(y1) / (lambda * y2))) - (cos(y1) / y2) - (0.5 * y5 / 4) - (0.5 *cos(y1) * y4 / (4 * y2)) + (ydot * cos(y1) / y2) + (sin(y1) / lambda) + (0.5 * lambda * y4 * cos(y1) / (4 * y2)) + (sin(y1) * cos(y1) / y2^2) + (mu_1*(sin(y1) - mu_2*cos(y1)) / (2 * y2));

dydx = [y5; y6; y7; ydot; yddot];

end

But I have no equation for p'. And I am not sure that how can I relate x and z with x' and z' respectively. Also I don't have any differential equation for p'. how I should relate p and p'?

need some suggestions.

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Md Sojib am 6 Jun. 2024

Bearbeitet: Md Sojib am 6 Jun. 2024

I don't have any separate equation for p or p'. But after derivation, differential equations contains these two terms.

Torsten am 6 Jun. 2024

Then you will have to dive into the derivation of the equations again. If you don't know the equation for a function within your problem formulation, how do you want to solve it ?

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