Numerical solution for the heat equation does not match the exact solution

2 Ansichten (letzte 30 Tage)
I write a matlab code for the problem, and i want to compare the numerucal and the exact solution at t=0.5 but the graph of the soultions are very different.
The problem is in the following:
% Parameters
L = 5; % Length of the rod
T = 1; % Total time
Nx = 100; % Number of spatial points
Nt = 500; % Number of time steps
alpha = 0.01; % Thermal diffusivity
% Discretization
dx = 0.1; % Spatial step size
dt = 0.04; % Time step size
r = alpha * dt / dx^2; % Stability parameter for the scheme
% Initial condition
x = linspace(0, L, Nx);% generates Nx points. The spacing between the points is (L-0)/(Nx-1).
u = cos(x-0.5); % initial condition
% Preallocate solution matrix
U = zeros(Nx, Nt+1); % returns an Nx-by-Nt matrix of zeros
U(:,1) = u; %extracts all the elements from the first column of matrix
% Time-stepping loop
for n = 1:Nt
% Update the solution using explicit scheme for the Heat Equation
for i = 2:Nx-1
U(i,n+1) = U(i,n) + r * (U(i+1,n) - 2*U(i,n) + U(i-1,n));
end
end
Numerical_sol = U
% Plot results
t = linspace(0, T, Nt+1);
[X, T] = meshgrid(x, t);
% Exact solution
Exact= @(x, t) exp(-t) .* cos(pi * x - 0.5 * pi);
figure;
mesh(X, T, U');
xlabel('x');
ylabel('t');
zlabel('u(x,t)');
title('Heat Equation Solution');
figure
plot(x, U(:,1), 'o');
  2 Kommentare
John D'Errico
John D'Errico am 5 Sep. 2024
You accepted the answer to this question. Then you asked it just again, 42 minutes ago. I closed the duplicate question, since it asks nothing you should not have learned here.
Torsten
Torsten am 5 Sep. 2024
I didn't know that you are the Website Master taking the right to delete questions and answers that are actually in flow.

Melden Sie sich an, um zu kommentieren.

Akzeptierte Antwort

Torsten
Torsten am 4 Sep. 2024
Verschoben: Torsten am 4 Sep. 2024
I cannot believe that the value for alpha has no influence on the solution.
So I guess that the exact solution maybe holds for alpha = 1.
  10 Kommentare
Torsten
Torsten am 4 Sep. 2024
Bearbeitet: Torsten am 4 Sep. 2024
The exact solution for the differential equation
du/dt = alpha * d^2u/dx^2
with initial condition
u(0,x) = cos(pi*(x-0.5))
and boundary conditions
u(t,0) = u(t,1) = 0
is given by
uexact(t,x) = exp(-alpha*pi^2*t) * cos(pi*(x-0.5))
That's the function you have to compare the numerical solution with.
syms x t alpha pi
u = exp(-alpha*pi^2*t) * cos(pi*(x-0.5));
diff(u,t)
ans = 
alpha*diff(u,x,2)
ans = 

Melden Sie sich an, um zu kommentieren.

Weitere Antworten (0)

Community Treasure Hunt

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

Start Hunting!

Translated by