Discrete Laplacian (del2 equivalent) in Python
Question:
I need the Python / Numpy equivalent of Matlab (Octave) discrete Laplacian operator (function) del2(). I tried couple Python solutions, none of which seem to match the output of del2. On Octave I have
image = [3 4 6 7; 8 9 10 11; 12 13 14 15;16 17 18 19]
del2(image)
this gives the result
0.25000 -0.25000 -0.25000 -0.75000
-0.25000 -0.25000 0.00000 0.00000
0.00000 0.00000 0.00000 0.00000
0.25000 0.25000 0.00000 0.00000
On Python I tried
import numpy as np
from scipy import ndimage
import scipy.ndimage.filters
image = np.array([[ 3, 4, 6, 7],
[ 8, 9, 10, 11],
[12, 13, 14, 15],
[16, 17, 18, 19]])
stencil = np.array([[0, 1, 0],
[1, -4, 1],
[0, 1, 0]])
print ndimage.convolve(image, stencil, mode='wrap')
which gives the result
[[ 23 19 15 11]
[ 3 -1 0 -4]
[ 4 0 0 -4]
[-13 -17 -16 -20]]
I also tried
scipy.ndimage.filters.laplace(image)
That gives the result
[[ 6 6 3 3]
[ 0 -1 0 -1]
[ 1 0 0 -1]
[-3 -4 -4 -5]]
So none of the outputs seem to match eachother. Octave code del2.m suggests that it is a Laplacian operator. Am I missing something?
Answers:
Maybe you are looking for scipy.ndimage.filters.laplace() (which in 2023 is scipy.ndimage.laplace).
Based on the code here
http://cns.bu.edu/~tanc/pub/matlab_octave_compliance/datafun/del2.m
I attempted to write a Python equivalent. It seems to work, any feedback will be appreciated.
import numpy as np
def del2(M):
dx = 1
dy = 1
rows, cols = M.shape
dx = dx * np.ones ((1, cols - 1))
dy = dy * np.ones ((rows-1, 1))
mr, mc = M.shape
D = np.zeros ((mr, mc))
if (mr >= 3):
## x direction
## left and right boundary
D[:, 0] = (M[:, 0] - 2 * M[:, 1] + M[:, 2]) / (dx[:,0] * dx[:,1])
D[:, mc-1] = (M[:, mc - 3] - 2 * M[:, mc - 2] + M[:, mc-1])
/ (dx[:,mc - 3] * dx[:,mc - 2])
## interior points
tmp1 = D[:, 1:mc - 1]
tmp2 = (M[:, 2:mc] - 2 * M[:, 1:mc - 1] + M[:, 0:mc - 2])
tmp3 = np.kron (dx[:,0:mc -2] * dx[:,1:mc - 1], np.ones ((mr, 1)))
D[:, 1:mc - 1] = tmp1 + tmp2 / tmp3
if (mr >= 3):
## y direction
## top and bottom boundary
D[0, :] = D[0,:] +
(M[0, :] - 2 * M[1, :] + M[2, :] ) / (dy[0,:] * dy[1,:])
D[mr-1, :] = D[mr-1, :]
+ (M[mr-3,:] - 2 * M[mr-2, :] + M[mr-1, :])
/ (dy[mr-3,:] * dx[:,mr-2])
## interior points
tmp1 = D[1:mr-1, :]
tmp2 = (M[2:mr, :] - 2 * M[1:mr - 1, :] + M[0:mr-2, :])
tmp3 = np.kron (dy[0:mr-2,:] * dy[1:mr-1,:], np.ones ((1, mc)))
D[1:mr-1, :] = tmp1 + tmp2 / tmp3
return D / 4
You can use convolve to calculate the laplacian by convolving the array with the appropriate stencil:
from scipy.ndimage import convolve
stencil= (1.0/(12.0*dL*dL))*np.array(
[[0,0,-1,0,0],
[0,0,16,0,0],
[-1,16,-60,16,-1],
[0,0,16,0,0],
[0,0,-1,0,0]])
convolve(e2, stencil, mode='wrap')
# Laplacian operator (2nd order cetral-finite differences)
# dx, dy: sampling, w: 2D numpy array
def laplacian(dx, dy, w):
""" Calculate the laplacian of the array w=[] """
laplacian_xy = np.zeros(w.shape)
for y in range(w.shape[1]-1):
laplacian_xy[:, y] = (1/dy)**2 * ( w[:, y+1] - 2*w[:, y] + w[:, y-1] )
for x in range(w.shape[0]-1):
laplacian_xy[x, :] = laplacian_xy[x, :] + (1/dx)**2 * ( w[x+1,:] - 2*w[x,:] + w[x-1,:] )
return laplacian_xy
I need the Python / Numpy equivalent of Matlab (Octave) discrete Laplacian operator (function) del2(). I tried couple Python solutions, none of which seem to match the output of del2. On Octave I have
image = [3 4 6 7; 8 9 10 11; 12 13 14 15;16 17 18 19]
del2(image)
this gives the result
0.25000 -0.25000 -0.25000 -0.75000
-0.25000 -0.25000 0.00000 0.00000
0.00000 0.00000 0.00000 0.00000
0.25000 0.25000 0.00000 0.00000
On Python I tried
import numpy as np
from scipy import ndimage
import scipy.ndimage.filters
image = np.array([[ 3, 4, 6, 7],
[ 8, 9, 10, 11],
[12, 13, 14, 15],
[16, 17, 18, 19]])
stencil = np.array([[0, 1, 0],
[1, -4, 1],
[0, 1, 0]])
print ndimage.convolve(image, stencil, mode='wrap')
which gives the result
[[ 23 19 15 11]
[ 3 -1 0 -4]
[ 4 0 0 -4]
[-13 -17 -16 -20]]
I also tried
scipy.ndimage.filters.laplace(image)
That gives the result
[[ 6 6 3 3]
[ 0 -1 0 -1]
[ 1 0 0 -1]
[-3 -4 -4 -5]]
So none of the outputs seem to match eachother. Octave code del2.m suggests that it is a Laplacian operator. Am I missing something?
Maybe you are looking for scipy.ndimage.filters.laplace() (which in 2023 is scipy.ndimage.laplace).
Based on the code here
http://cns.bu.edu/~tanc/pub/matlab_octave_compliance/datafun/del2.m
I attempted to write a Python equivalent. It seems to work, any feedback will be appreciated.
import numpy as np
def del2(M):
dx = 1
dy = 1
rows, cols = M.shape
dx = dx * np.ones ((1, cols - 1))
dy = dy * np.ones ((rows-1, 1))
mr, mc = M.shape
D = np.zeros ((mr, mc))
if (mr >= 3):
## x direction
## left and right boundary
D[:, 0] = (M[:, 0] - 2 * M[:, 1] + M[:, 2]) / (dx[:,0] * dx[:,1])
D[:, mc-1] = (M[:, mc - 3] - 2 * M[:, mc - 2] + M[:, mc-1])
/ (dx[:,mc - 3] * dx[:,mc - 2])
## interior points
tmp1 = D[:, 1:mc - 1]
tmp2 = (M[:, 2:mc] - 2 * M[:, 1:mc - 1] + M[:, 0:mc - 2])
tmp3 = np.kron (dx[:,0:mc -2] * dx[:,1:mc - 1], np.ones ((mr, 1)))
D[:, 1:mc - 1] = tmp1 + tmp2 / tmp3
if (mr >= 3):
## y direction
## top and bottom boundary
D[0, :] = D[0,:] +
(M[0, :] - 2 * M[1, :] + M[2, :] ) / (dy[0,:] * dy[1,:])
D[mr-1, :] = D[mr-1, :]
+ (M[mr-3,:] - 2 * M[mr-2, :] + M[mr-1, :])
/ (dy[mr-3,:] * dx[:,mr-2])
## interior points
tmp1 = D[1:mr-1, :]
tmp2 = (M[2:mr, :] - 2 * M[1:mr - 1, :] + M[0:mr-2, :])
tmp3 = np.kron (dy[0:mr-2,:] * dy[1:mr-1,:], np.ones ((1, mc)))
D[1:mr-1, :] = tmp1 + tmp2 / tmp3
return D / 4
You can use convolve to calculate the laplacian by convolving the array with the appropriate stencil:
from scipy.ndimage import convolve
stencil= (1.0/(12.0*dL*dL))*np.array(
[[0,0,-1,0,0],
[0,0,16,0,0],
[-1,16,-60,16,-1],
[0,0,16,0,0],
[0,0,-1,0,0]])
convolve(e2, stencil, mode='wrap')
# Laplacian operator (2nd order cetral-finite differences)
# dx, dy: sampling, w: 2D numpy array
def laplacian(dx, dy, w):
""" Calculate the laplacian of the array w=[] """
laplacian_xy = np.zeros(w.shape)
for y in range(w.shape[1]-1):
laplacian_xy[:, y] = (1/dy)**2 * ( w[:, y+1] - 2*w[:, y] + w[:, y-1] )
for x in range(w.shape[0]-1):
laplacian_xy[x, :] = laplacian_xy[x, :] + (1/dx)**2 * ( w[x+1,:] - 2*w[x,:] + w[x-1,:] )
return laplacian_xy