ode45 with a array of vector

2 views (last 30 days)
AkB
AkB on 23 Mar 2023
Commented: AkB on 27 Mar 2023
I am solving 6 ODEs simultaneously. My eqns are:
eq1 = diff(x,t) == u1+vp.*p1 ;
eq2 = diff(y,t) == u2+vp.*p2 ;
eq3 = diff(z,t) == u3+vp.*p3 ;
eq1 = diff(p1,t) == a1*p1+a2*p2+a3*p3 ;
eq2 = diff(p2,t) == b1*p1+b2*p2+b3*p3 ;
eq3 = diff(p3,t) == c1*p1+c2*p2+c3*p3 ;
Here, a1, a2, a3, b1, b2 b3, c1, c2, c3 and vp are constants.
u1, u2, and u3 are vector of dimension [1 X 100]. Each values of u1, u2, and u3 corresponds to time points in tValues = linspace(0,10,100). I want to compute p1, p2, p3 and x, y, z for tValues = linspace(0,10,100).
My code is following: ;
vars = [x(t); z(t); y(t); p1(t); p2(t); p3(t)];
V = odeToVectorField([eq2 eq1 eq3 eq4 eq5 eq6]);
M = matlabFunction(V,'vars', {'t','Y'});
y0=[0 0 0 p1_0 p2_0 p3_0];
ySol_a = ode45(M,interval,y0);
Once the code is run, it shows following error message:
MuPAD error: Error: Cannot convert the initial value problem to an equivalent dynamical system. Either the differential equations cannot be solved for the highest derivatives or inappropriate initial conditions were specified. [numeric::ode2vectorfield]

Sign in to answer this question.

Accepted Answer

Torsten
Torsten on 23 Mar 2023
a1 = ...;
a2 = ...;
a3 = ...;
b1 = ...;
b2 = ...;
b3 = ...;
c1 = ...;
c2 = ...;
c3 = ...;
vp = ...;
tValues = linspace(0,10,100);
u1Values = ...;
u2Values = ...;
u3Values = ...;
u1fun = @(t)interp1(tValues,u1Values,t);
u2fun = @(t)interp1(tValues,u2Values,t);
u3fun = @(t)interp1(tValues,u3Values,t);
fun = @(t,y)[u1fun(t)+vp*y(4);u2fun(t)+vp*y(5);u3fun(t)+vp*y(6);a1*y(4)+a2*y(5)+a3*y(6);b1*y(4)+b2*y(5)+b3*y(6);c1*y(4)+c2*y(5)+c3*y(6)];
tspan = tValues;
p1_0 = ...;
p2_0 = ...;
p3_0 = ...;
y0 = [0 0 0 p1_0 p2_0 p3_0];
[T,Y] = ode45(fun,tspan,y0);
plot(T,Y)
  6 Comments
Show 4 older comments
Torsten
Torsten on 25 Mar 2023
How do I provide this dynamic initial condition?
I think I answered this already. An initial condition is not dynamic.
If you want to set
v1(t) = constant1 + vp*p1,
v2(t) = constant2 + vp*p2,
v3(t) = constant3 + vp*p3
your equations to integrate become
diff(x,t) = constant1 + vp*p1
diff(y,t) = constant2 + vp*p2
diff(z,t) = constant3 + vp*p3
diff(p1,t) == JTx_1+JTx_2+JTx_3;
diff(p2,t) == JTy_1+JTy_2+JTy_3;
diff(p3,t) == JTz_1+JTz_2+JTz_3;
AkB
AkB on 27 Mar 2023
Thanks, it works.

Sign in to comment.

More Answers (0)

Categories

Find more on Ordinary Differential Equations in Help Center and File Exchange

Tags

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!