Cannot find solution with dsolve but I know that a relatively simple solution does exist
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I'm using dsolve to solve a simple system of ODE's. I know there must be an analytical solution because our professor has tasked us with finding it, but MATLAB fails to produce a result.
Does anyone know why this would be failing?
Here is my code:
syms a(t) b(t) c(t) d(t) e(t)
ode1 = diff(a,t) == -5*a + .01*e;
ode2 = diff(b,t) == 5*a - 15*b;
ode3 = diff(c,t) == 5*a - .5*c*d;
ode4 = diff(d,t) == 15*b -.5*c*d;
ode5 = diff(e,t) == .5*c*d - .01*e;
odes = [ode1; ode2; ode3; ode4; ode5;];
conds = [a(0) == 5; b(0) == 0; c(0) == 0; d(0) == .5; e(0) == 1];
[a b c d e] = dsolve(odes, conds);
hold on
fplot(a)
fplot(b)
fplot(c)
fplot(d)
fplot(e)
Antworten (1)
Star Strider
am 13 Apr. 2021
The dsolve function apparently does not integrate nonlinear differential equations.
This is likely the best you can hope for:
syms a(t) b(t) c(t) d(t) e(t) t Y
ode1 = diff(a,t) == -5*a + .01*e;
ode2 = diff(b,t) == 5*a - 15*b;
ode3 = diff(c,t) == 5*a - .5*c*d;
ode4 = diff(d,t) == 15*b -.5*c*d;
ode5 = diff(e,t) == .5*c*d - .01*e;
odes = [ode1; ode2; ode3; ode4; ode5;];
conds = [a(0) == 5; b(0) == 0; c(0) == 0; d(0) == .5; e(0) == 1];
[VF,Subs] = odeToVectorField(odes);
odes_fcn = matlabFunction(VF, 'Vars',{t,Y});
tspan = [0 10];
ics = [0 5 0 0.5 1];
[t,y] = ode45(odes_fcn, tspan, ics);
figure
plot(t,y)
grid
legend(string(Subs), 'Location','best')
.
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