We consider the Poisson equation $$ -(u_{xx} + u_{yy}) = f, \quad\textrm{in}\quad \Omega = [0,1] \times [0,1] $$ with boundary condition $$ u = 0, \quad\textrm{on}\quad \partial\Omega $$ We will take $$ f = 1 $$ Make a uniform grid with $n$ points in each direction, with spacing $$ h = \frac{1}{n-1} $$ The grid points are $$ x_i = ih, \quad 0 \le i \le n-1 $$ $$ y_j = jh, \quad 0 \le j \le n-1 $$ The finite difference approximation at $(i,j)$ is $$ -\frac{u_{i-1,j} - 2u_{i,j} + u_{i+1,j}}{\Delta x^2} - \frac{u_{i,j-1} - 2u_{i,j} + u_{i,j+1}}{\Delta y^2} = f_{i,j}, \qquad 1 \le i \le n-2, \quad 1 \le j \le n-2 $$ This set of equations if of the form $$ A U = b $$ where $$ A \in \Re^{(n-2)^2 \times (n-2)^2}, \qquad U,b \in \Re^{(n-2)^2} $$
import numpy as np
from matplotlib import pyplot as plt
This function computes matrix-vector product.
def ax(h,u):
n = u.shape[0]
res = np.zeros((n,n))
for i in range(1,n-1):
for j in range(1,n-1):
res[i,j] = -(u[i-1,j]-2*u[i,j]+u[i+1,j])/h**2 \
-(u[i,j-1]-2*u[i,j]+u[i,j+1])/h**2
return res
xmin,xmax = 0.0,1.0
n = 21
h = (xmax - xmin)/(n-1)
x = np.linspace(xmin,xmax,n)
X,Y = np.meshgrid(x,x)
f = np.ones((n,n))
TOL = 1.0e-6
itmax = 2000
u = np.zeros((n,n))
p = np.zeros((n,n))
res = np.array(f)
# First and last grid point, solution is fixed to zero.
# Hence we make residual zero, in which case solution
# will not change at these points.
res[0,:] = 0.0
res[n-1,:] = 0.0
res[:,0] = 0.0
res[:,n-1] = 0.0
f_norm = np.linalg.norm(f)
res_old, res_new = 0.0, 0.0
for it in range(itmax):
res_new = np.linalg.norm(res)
if res_new < TOL * f_norm:
break
if it==0:
beta = 0.0
else:
beta = res_new**2 / res_old**2
p = res + beta * p
ap= ax(h,p)
alpha = res_new**2 / np.sum(p*ap)
u += alpha * p
res -= alpha * ap
res_old = res_new
print "Number of iterations = %d" % it
cs = plt.contourf(X,Y,u)
plt.colorbar(cs);
Number of iterations = 31