2D ODE with constant? how to solve
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Most parts of your code is ok, but within the loop, you have overlooked sth and thus, you final solutions are not quite accurate. Here is ODE45 simulation which can be compared with your simulation results.
ICs=[0.6;0.6];
a=0.10;
b=10;
t=[0,60];
F = @(t, z)([a-z(1)+z(1).^2*z(2);b-z(1).^2*z(2)]);
OPTs = odeset('reltol', 1e-6, 'abstol', 1e-9);
[time, z]=ode45(F, t, ICs, OPTs);
figure(2)
plot(time,z(:,1),'b',time,z(:,2),'r')
xlabel('time')
ylabel('x(t) y(t)')
legend('x(t)', 'y(t)', 'location', 'best')
title('Schnackenberg eqn simulation'), xlim([0, 5])
figure(1)
plot(z(:,1),z(:,2),'k')
title('Simulation using ODE45'), grid on
xlabel('x(t)')
ylabel('y(t)')
Più risposte (1)
Sulaymon Eshkabilov
il 4 Ago 2021
0 voti
Use odex (ode23, ode45, ode113, etc.) solvers. See this doc how to employ them in your exercise: https://www.mathworks.com/help/matlab/ref/ode45.html?searchHighlight=ode45&s_tid=srchtitle
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