How to solve Coupled Differential Equations

9 Mayo 2021
3 Respuestas
Actualizado a las 8 Feb. 2025
46 Visualizaciones (30 días)

Respuestas (3)

Star Strider
Star Strider el 9 de Mayo de 2021
Ran in:

0 votos

Ran in:
Try this —
syms x(t) y(t) x0 y0
Dx = diff(x);
Dy = diff(y);
ode1 = Dy-Dx == 2 - x
ode1(t) = 
ode2 = 2-Dy - Dy == 3 + 2*y
ode2(t) = 
S = dsolve(ode1, ode2, x(0)==x0, y(0)==y0)
S = struct with fields:
y: [1×1 sym] x: [1×1 sym]
x(t) = simplify(S.x, 500)
x(t) = 
y(t) = simplify(S.y, 500)
y(t) = 
.

4 comentarios
Mostrar 2 comentarios más antiguos Ocultar 2 comentarios más antiguos

Lorenzo
Lorenzo el 8 de Feb. de 2025
There is a way to plot the solutions x(t) and y(t) ?
Thanks
Walter Roberson
Walter Roberson el 8 de Feb. de 2025
@Lorenzo
No, it is not possible to plot y(t) . y(t) involves three independent variables: t, x0, and y0. There are no built-in functions for plotting 3 independent variables plus one resultant variable.
Lorenzo
Lorenzo el 8 de Feb. de 2025
Thank you
Walter Roberson
Walter Roberson el 8 de Feb. de 2025
Ran in:
Ran in:
Of course, for given x0 and y0, it is easy enough to plot.
syms x(t) y(t) x0 y0
Dx = diff(x);
Dy = diff(y);
ode1 = Dy-Dx == 2 - x
ode1(t) = 
ode2 = 2-Dy - Dy == 3 + 2*y
ode2(t) = 
S = dsolve(ode1, ode2, x(0)==x0, y(0)==y0)
S = struct with fields:
y: exp(-t)*(y0 - exp(t)/2 + 1/2) x: exp(t)*(x0 - y0/2 + (9*exp(-t))/4 - 9/4) + (exp(-t)*(y0 - exp(t)/2 + 1/2))/2
x(t) = simplify(S.x, 500)
x(t) = 
y(t) = simplify(S.y, 500)
y(t) = 
X0 = -2;
Y0 = 1.5;
sX = subs(x, [x0, y0], [X0, Y0])
sX(t) = 
sY = subs(y, [x0, y0], [X0, Y0])
sY(t) = 
fplot(sX, [0 5])
fplot(sY, [0 5])

Iniciar sesión para comentar.

Walter Roberson
Walter Roberson el 9 de Mayo de 2021

0 votos

yprime - xprime == 2-x, 2*xprime - yprime == 3 + 2*y
2*yprime - 2*xprime == 4-2*x, 2*xprime - yprime == 3 + 2*y
2*yprime - 2*xprime + 2*xprime - yprime == 4-2*x + 3 + 2*y
yprime == 7 - 2*x + 2*y
7 - 2*x + 2*y - xprime == 2*x
7 - 2*x + 2*y - 2*x == xprime
xprime = 7 - 4*x + 2*y
So...
function dxy = odefun(t, xy)
dxy = [7 - 4*xy(1) + 2*xy(2); 7 - 2*xy(1) + 2*xy(2)];
end

4 comentarios
Mostrar 2 comentarios más antiguos Ocultar 2 comentarios más antiguos

Tomasz
Tomasz el 9 de Mayo de 2021
this:
2*yprime - 2*xprime == 4-2*x, 2*xprime - yprime == 3 + 2*y
2*yprime - 2*xprime + 2*xprime - yprime == 4-2*x + 3 + 2*y
is it OK??
Walter Roberson
Walter Roberson el 9 de Mayo de 2021
2*yprime - 2*xprime == 4-2*x, 2*xprime - yprime == 3 + 2*y
add the two equations
(2*yprime - 2*xprime) + (2*xprime - yprime) == (4-2*x) + (3 + 2*y)
Walter Roberson
Walter Roberson el 9 de Mayo de 2021
Ran in:
Ran in:
syms xprime yprime x y
eqn = [yprime - xprime == 2-x, 2*xprime - yprime == 3 + 2*y]
eqn = 
sol = solve(eqn, [xprime, yprime])
sol = struct with fields:
xprime: [1×1 sym] yprime: [1×1 sym]
sol.xprime
ans = 
sol.yprime
ans = 
Hmmm, where did I go wrong?
Walter Roberson
Walter Roberson el 9 de Mayo de 2021
I did make a mistake, but it was the step after you indicated. I copied as 2*x instead of 2-x . The corrected version is
yprime - xprime == 2-x, 2*xprime - yprime == 3 + 2*y
2*yprime - 2*xprime == 4-2*x, 2*xprime - yprime == 3 + 2*y
2*yprime - 2*xprime + 2*xprime - yprime == 4-2*x + 3 + 2*y
yprime == 7 - 2*x + 2*y
7 - 2*x + 2*y - xprime == 2 - x %corrected
7 - 2*x + 2*y - (2 - x) == xprime
xprime = 5 - x + 2*y
So...
function dxy = odefun(t, xy)
dxy = [5 - xy(1) + 2*xy(2); 7 - 2*xy(1) + 2*xy(2)];
end

Iniciar sesión para comentar.

Sam Chak
Sam Chak el 8 de Feb. de 2025
Ran in:

0 votos

Ran in:
Hi @Lorenzo
Primarily, coupled ordinary differential equations (ODEs) in additive form can be decoupled using the substitution and elimination method (Grade 10 algebra). In this simple system, we can decouple the ODEs simultaneously using the matrix method.
The coupled ODEs
can be expressed in matrix form
and simplified to
.
Because of the square matrix property , we can manipulate the matrix equation to become
so that we can solve the following decoupled ODEs
.
Method 1: Numerical approach
% Describe the ODEs inside the function
function dx = ode(t, x)
dx(1) = 5 - 1*x(1) + 2*x(2); % ODE 1
dx(2) = 7 - 2*x(1) + 2*x(2); % ODE 2
dx = [dx(1)
dx(2)]; % arranged in column vector
end
% Call ode45 to numerically solve the system
tspan = [0 10]; % time interval from 0 to 10
xinit = [1; 0]; % initial condition at time 0
[t, x] = ode45(@ode, tspan, xinit);
plot(t, x), grid on, xlabel('Time'), legend('x(t)', 'y(t)')
title('Numerical Solutions')
Method 2: Symbolical approach to obtain the analytical solutions (using @Star Strider's code):
%% Requires Symbolic Math Toolbox
syms x(t) y(t) x0 y0
Dx = diff(x);
Dy = diff(y);
ode1 = Dy - Dx == 2 - x
ode1(t) = 
ode2 = 2*Dx - Dy == 3 + 2*y
ode2(t) = 
S = dsolve(ode1, ode2, x(0)==1, y(0)==0) % specify the initial condition here
S = struct with fields:
y: - exp(t/2)*sin((7^(1/2)*t)/2)*((exp(-t/2)*(21*sin((7^(1/2)*t)/2) + 25*7^(1/2)*cos((7^(1/2)*t)/2)))/14 - (17*7^(1/2))/14) - exp(t/2)*cos((7^(1/2)*t)/2)*((exp(-t/2)*(21*co... x: - ((3*exp(t/2)*cos((7^(1/2)*t)/2))/4 + (7^(1/2)*exp(t/2)*sin((7^(1/2)*t)/2))/4)*((exp(-t/2)*(21*cos((7^(1/2)*t)/2) - 25*7^(1/2)*sin((7^(1/2)*t)/2)))/14 - 3/2) - ((3*exp(...
x(t) = simplify(S.x, 500)
x(t) = 
y(t) = simplify(S.y, 500)
y(t) = 
fplot(x(t), [0 10]), hold on, grid on, ylim([-300, 500])
fplot(y(t), [0 10]), hold off, xlabel('Time'), legend('x(t)', 'y(t)')
title('Analytical Solutions')

Categorías

Más información sobre Programming en Centro de ayuda y File Exchange.

Etiquetas

Preguntada:

Tomasz
Tomasz
el 9 de Mayo de 2021

Comentada:

Walter Roberson
Walter Roberson
el 8 de Feb. de 2025

Community Treasure Hunt

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

Start Hunting!

Translated by