Hello, I need to draw a direction field and sketch phase potrait for this differential equation:
dL/dA = (-0.5L+0.0001AL)/2A(1-0.0001A)-0.01AL
How would I do it?
thank you for helping!

 Akzeptierte Antwort

Sam Chak
Sam Chak am 25 Apr. 2022
Bearbeitet: Sam Chak am 25 Apr. 2022

1 Stimme

You can basically plot the direction field like this:
[A, L] = meshgrid(0.1:10/14:10.1, -5:10/14:5);
M = (- 0.5*L + 0.0001*A.*L)./(2*A.*(1 - 0.0001*A) - 0.01*A.*L);
N = sqrt(1 + M.^2);
U = 1./N;
V = M./N;
quiver(A, L, U, V, 0.5)
axis square
hold on
% differential equation
f = @(A, L) (- 0.5*L + 0.0001*A*L)/(2*A*(1 - 0.0001*A) - 0.01*A*L);
tspan = 0.1:0.01:10.1; % simulation time
init = 4; % initial condition L(0.1) = 4
[A, L] = ode45(f, tspan, init);
plot(A, L, 'r', 'linewidth', 1.5)
hold off
Result:
For more info, please visit the documentation:

4 Kommentare

Tuân Nguyen
Tuân Nguyen am 25 Apr. 2022
Bearbeitet: Tuân Nguyen am 25 Apr. 2022
hello, thank for your help but I made a big mistake, it should be
dL/dA = (-0.5L+0.0001AL)/(2A(1-0.0001A)-0.01AL)
not dL/dA = (-0.5L+0.0001AL)/2A(1-0.0001A)-0.01AL
It is still right if I changed the second line to the right DE?
Sam Chak
Sam Chak am 25 Apr. 2022
Alright, I've fixed the the ODE as requested.
Note that the simulation cannot be run from A = 0, else it will cause singularity issue (division-by-zero).
In this example, I run A from 0.1 to 10.1, and select the initial condition, L(0.1) = 4.
Tuân Nguyen
Tuân Nguyen am 25 Apr. 2022
Understood!
Thank you for helping!
Sam Chak
Sam Chak am 25 Apr. 2022
Cảm ơn for your acceptance!

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