I am trying to solve the system of coupled partial differential equations described in the attachment using the function pdepe. My code runs into this error:

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function [c,f,s] = pdefun(x,t,u,dudx) % Equation to solve
c = [1; 1];
f = [-0.6; 1.32].*u;
s = [0; 0];
end
function u0 = pdeic(x) % Initial Conditions
u0 = [sin(pi*x); sin(pi*x)];
end
function [pl,ql,pr,qr] = pdebc(xl,ul,xr,ur,t) % Boundary Conditions
pl = [2.2*ul(2)+ ul(1); 0];
ql = [0; 0];
pr = [0; ur(2)];
qr = [0; 0];
end
x = linspace(0,1,50);
t = linspace(0,2,50);
m = 0;
sol = pdepe(m,@pdefun,@pdeic,@pdebc,x,t);
u1 = sol(:,:,1);
u2 = sol(:,:,2);
surf(x,t,u1)
title('u_(x,t)')
xlabel('Distance x')
ylabel('Time t')

Accepted Answer

Torsten
Torsten on 15 Aug 2024
Edited: Torsten on 15 Aug 2024
"pdepe" is a solver for parabolic-elliptic partial differential equations (with a second-order spatial derivative term modelling diffusion in each of the equations).
Your equations are pure hyperbolic in nature (only convection without diffusion) and thus cannot be solved with "pdepe".
The "technical" problems with the solver are that you don't prescribe boundary conditions for the first equation in x = 1 (pr(1) = qr(1) = 0) and for the second equation in x = 0 (pl(2) = ql(2) = 0). That's mathematically correct, but - as said - the solver is designed for second-order PDEs which need boundary conditions at both ends of the integration interval.
Further, f in "pdefun" should be f = [0;0] and s should be s = [-0.6; 1.32].*dudx .
  6 Comments
Torsten
Torsten on 19 Aug 2024
Edited: Torsten on 20 Aug 2024
Here is the code for your problem with the method-of-lines approach:
x = linspace(0,1,500);
t = linspace(0,1,30);
n = numel(x);
M = eye(2*n);
M(1,1) = 0;
M(2*n,2*n) = 0;
y0 = [sin(pi*x),sin(pi*x)];
options = odeset('Mass',M);
[T,Y] = ode15s(@(t,y)fun(t,y,x.'),t,y0,options);
alpha = Y(:,1:n);
beta = Y(:,n+1:2*n);
figure(1)
hold on
plot(x,alpha(end,:),'r')
plot(x,beta(end,:),'b')
hold off
title 'solution at final time'; legend('alpha', 'beta');
grid on
figure(2)
hold on
plot(t,alpha(:,1),'r')
plot(t,beta(:,1),'b')
hold off
title 'solution at left end as a function of time'; legend('alpha', 'beta');
grid on
figure(3)
hold on
plot(t,alpha(:,end),'r')
plot(t,beta(:,end),'b')
hold off
title 'solution at right end as a function of time'; legend('alpha', 'beta');
grid on
function dy = fun(t,y,x)
n = numel(y)/2;
alpha = y(1:n);
beta = y(n+1:2*n);
dalpha = zeros(n,1);
dbeta = zeros(n,1);
dalpha(1) = alpha(1) + 2.2*beta(1);
dalpha(2:n) = -0.6*(alpha(2:n)-alpha(1:n-1))./(x(2:n)-x(1:n-1));
dbeta(1:n-1) = 1.32*(beta(2:n)-beta(1:n-1))./(x(2:n)-x(1:n-1));
dbeta(n) = beta(n);
dy = [dalpha;dbeta];
end

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More Answers (1)

Bill Greene
Bill Greene on 19 Aug 2024
Edited: Torsten on 19 Aug 2024
The reason for the error you are getting is that your boundary condition definition (p=0 and q=0) is invalid.
I modified your pdefun into an equivalent form and provided a valid boundary condition definition as shown below.
matlabAnswers_8_19_2024()
function matlabAnswers_8_19_2024
x = linspace(0,1,100);
t = linspace(0,1,30);
m = 0;
sol = pdepe(m,@pdefun,@pdeic,@pdebc,x,t);
u1 = sol(:,:,1);
u2 = sol(:,:,2);
if 0
surf(x,t,u1)
title('u_(x,t)')
xlabel('Distance x')
ylabel('Time t')
end
figure; plot(x, u1(end,:), x, u2(end,:));
title 'solution at final time'; legend('u1', 'u2');
figure; plot(t, u1(:,1), t, u2(:,1));
title 'solution at left end as a function of time';
legend('u1', 'u2');
figure; plot(t, u1(:,end), t, u2(:,end));
title 'solution at right end as a function of time';
legend('u1', 'u2');
end
function [c,f,s] = pdefun(x,t,u,dudx) % Equation to solve
c = [1; 1];
if 0
f = [-0.6; 1.32].*u;
s = [0; 0];
else
f=[0 0]';
s = [-0.6; 1.32].*dudx;
end
end
function u0 = pdeic(x) % Initial Conditions
u0 = [sin(pi*x); sin(pi*x)];
end
function [pl,ql,pr,qr] = pdebc(xl,ul,xr,ur,t) % Boundary Conditions
pl = [2.2*ul(2)+ ul(1); 0];
ql = [0; 1];
pr = [0; ur(2)];
qr = [1; 0];
end
  3 Comments
Bill Greene
Bill Greene on 19 Aug 2024
I simply moved the term you defined as f to the s term.
The "if 0" is just a trick for commenting out your original lines. This is just basic matlab code syntax that you should be familiar with.
Yidan
Yidan on 21 Aug 2024
Thank you for your answer.
Could you please tell me if matrix p has elements equal to 0 in the boundary condition, does the element in the corresponding position q have to be 1 or some other value? What are the principles of boundary conditions?

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