I've coded up a neighbourhood smoothing filter that works on a user supplied 2D array - it works as it is but it could be far faster/less wasteful of memory as currently I am copying the entire input array each time the loop runs through. This will prove a real issue when large arrays are passed in.

The filter is defined as:

```
import numpy as np
import os
def conservative_smooth(array2D, kernel_size = 3):
stepsize = 1
if(kernel_size % 2 != 0 and kernel_size >= 3):
window = np.ones([kernel_size,kernel_size])
elif(kernel_size % 2 == 0 or kernel_size < 3):
print "kernel is even - it needs to be odd and at least of a value of 3"
os._exit(1)
nxwind, nywind = array2D.shape
for i in range(0, nxwind, stepsize):
for j in range(0, nywind, stepsize):
# CALCULATE MAX AND MIN RANGES OF ROWS AND COLS THAT CAN BE ACCESSED
# BY THE WINDOW
imin=max(0,i-((kernel_size-1)/2))
imax=min(nxwind-1,i+((kernel_size-1)/2))+1
jmin=max(0,j-((kernel_size-1)/2))
jmax=min(nywind-1,j+((kernel_size-1)/2))+1
# THIS IS THE MOST INEFFICIENT PART OF THE CODE
array2D_temp = array2D.copy()
array2D_temp[i,j] = np.nan
data_wind=array2D_temp[imin:imax,jmin:jmax]
centre_value = array2D[i,j]
max_value = np.nanmax(data_wind)
min_value = np.nanmin(data_wind)
if(centre_value > max_value):
centre_value = max_value
elif(centre_value < min_value):
centre_value = min_value
else:
centre_value = centre_value
## Append new centre value to output array
array2D[i,j] = centre_value
return array2D
```

A copy of the entire array is made so that the value at position [i,j] in the array can be temporarily made to NaN - I can't just copy the moving window regiuon of the array (which would be better) as [i,j] of the main array will not be [i,j] of the moving window array.

A simple "if value at position in moving window == value in main array" condition will not work either as this will fail if values are duplicated.

I've been testing the function using a simple random 10x10 array (`a = np.random.rand(10,10)`

)

Has anybody any suggestions?

`nan`

? It's not the same as`i, j`

but surely it's easy enough to find? – jonrsharpe Jul 31 '14 at 11:09