Shouldn't your solution array be three-dimensional instead of two-dimensional ? The way you arranged the code, you only get one solution at time T - the complete history for U is overwritten.
Need help solving heat equation using adi method
5 views (last 30 days)
Show older comments
Nx = 50;
Ny = 50;
dx = 1.0 / (Nx - 1);
dy = 2.0 / (Ny - 1);
T = 0.00001;
dt = 0.000000001;
Nt = 1000; % Total number of time steps
alpha = 4; % Diffusion coefficient
x = linspace(0, 1, Nx);
y = linspace(0, 2, Ny);
[X, Y] = meshgrid(x, y);
U = Y .* X + 1; % Initial condition
function val = f(x, y, t)
val = exp(t) * cos(pi * x / 2) * sin(pi * y / 4);
end
function U = apply_boundary_conditions(U, x, y, dy, dx)
U(:, 1) = 1; % y=0
U(:, end) = U(:, end-1) + dy .* x'; % y=2
U(1, :) = U(2, :) - dx * y; % x=0
U(end, :) = y' + 1; % x=1
end
% Thomas algorithm
function x = thomas_algorithm(a, b, c, d)
n = length(d);
c_star = zeros(n-1, 1);
d_star = zeros(n, 1);
x = zeros(n, 1);
c_star(1) = c(1) / b(1);
d_star(1) = d(1) / b(1);
for i = 2:n-1
temp = b(i) - a(i-1) * c_star(i-1);
c_star(i) = c(i) / temp;
d_star(i) = (d(i) - a(i-1) * d_star(i-1)) / temp;
end
d_star(n) = (d(n) - a(n-1) * d_star(n-1)) / b(n);
x(n) = d_star(n);
for i = n-1:-1:1
x(i) = d_star(i) - c_star(i) * x(i+1);
end
end
% ADI method
for n = 1:Nt
U = apply_boundary_conditions(U, x, y, dy, dx);
% First half-step: X-direction implicit, Y-direction explicit
for j = 2:Ny-1
a = -alpha * dt / (2 * dx^2) * ones(Nx-1, 1);
b = (1 + alpha * dt / dx^2) * ones(Nx, 1);
c = -alpha * dt / (2 * dx^2) * ones(Nx-1, 1);
d = U(j, 2:end-1)' + 0.5 * alpha * dt / dy^2 * (U(j+1, 2:end-1) - 2 * U(j, 2:end-1) + U(j-1, 2:end-1))' + dt * f(x(2:end-1), y(j), n*dt);
U(j, 2:end-1) = thomas_algorithm(a, b(2:end-1), c, d);
end
% Second half-step: Y-direction implicit, X-direction explicit
for i = 2:Nx-1
a = -alpha * dt / (2 * dy^2) * ones(Ny-1, 1);
b = (1 + alpha * dt / dy^2) * ones(Ny, 1);
c = -alpha * dt / (2 * dy^2) * ones(Ny-1, 1);
d = U(2:end-1, i) + 0.5 * alpha * dt / dx^2 * (U(2:end-1, i+1) - 2 * U(2:end-1, i) + U(2:end-1, i-1)) + dt * f(x(i), y(2:end-1), n*dt);
U(2:end-1, i) = thomas_algorithm(a, b(2:end-1), c, d);
end
U = apply_boundary_conditions(U, x, y, dy, dx);
end
% Visualization
surf(X, Y, U);
title('ADI Solution at T=' + string(T));
xlabel('X');
ylabel('Y');
zlabel('U');
colorbar;
Answers (1)
John D'Errico
on 12 May 2024
You say it works for sufficiently small values dt.
With that exp(t) term in there, do you seriously expect it to work well for large values of dt? I have dreams myself somedays...
See Also
Categories
Find more on Eigenvalue Problems in Help Center and File Exchange
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
You can also select a web site from the following list
Americas
- América Latina (Español)
- Canada (English)
- United States (English)
Europe
- Belgium (English)
- Denmark (English)
- Deutschland (Deutsch)
- España (Español)
- Finland (English)
- France (Français)
- Ireland (English)
- Italia (Italiano)
- Luxembourg (English)
- Netherlands (English)
- Norway (English)
- Österreich (Deutsch)
- Portugal (English)
- Sweden (English)
- Switzerland
- United Kingdom (English)
Asia Pacific
- Australia (English)
- India (English)
- New Zealand (English)
- 中国
- 日本Japanese (日本語)
- 한국Korean (한국어)