I will propose an answer that works fast and perfectly if you are looking for `exact match`

both in size and in image values.

The idea is to calculate a brute force search of the wanted `h x w`

*template* in a larger `H x W`

image. The bruteforce approach would consist in looking at all the possible `h x w`

windows over the image and check for pixel by pixel correspondence within the template. This however is very computationally expensive, but it can be accelerated.

```
im = np.atleast_3d(im)
H, W, D = im.shape[:3]
h, w = tpl.shape[:2]
```

By using the smart integral images one can calculate really fast the sum inside of a `h x w`

window starting at every pixel. An integral image is a summed area table (cumulative summed array), that can be calculated with numpy really fast as:

```
sat = im.cumsum(1).cumsum(0)
```

and it has really nice properties, such as the calculation of the sum of all the values within a window with only 4 arithmetic operations:

Thus, by calculating the sum of the template and matching it with the sum of `h x w`

windows over the integral image, it is easy to find a list of "possible windows" where sum of inside values is the same as the sum of the values in the template (a quick approximation).

```
iA, iB, iC, iD = sat[:-h, :-w], sat[:-h, w:], sat[h:, :-w], sat[h:, w:]
lookup = iD - iB - iC + iA
```

The above is a numpy vectorization of the operation of shown in the image for all the possible `h x w`

rectangles over the image (thus, really quick).

This will reduce a lot the number of possible windows (to 2 in one of my tests). The last step, would be to check for exact matches with the template:

```
posible_match = np.where(np.logical_and.reduce([lookup[..., i] == tplsum[i] for i in range(D)]))
for y, x in zip(*posible_match):
if np.all(im[y+1:y+h+1, x+1:x+w+1] == tpl):
return (y+1, x+1)
```

Note that here `y`

and `x`

coordinates correspond to the A point in the image, which is the previous row and column to the template.

Putting all together:

```
def find_image(im, tpl):
im = np.atleast_3d(im)
tpl = np.atleast_3d(tpl)
H, W, D = im.shape[:3]
h, w = tpl.shape[:2]
# Integral image and template sum per channel
sat = im.cumsum(1).cumsum(0)
tplsum = np.array([tpl[:, :, i].sum() for i in range(D)])
# Calculate lookup table for all the possible windows
iA, iB, iC, iD = sat[:-h, :-w], sat[:-h, w:], sat[h:, :-w], sat[h:, w:]
lookup = iD - iB - iC + iA
# Possible matches
possible_match = np.where(np.logical_and.reduce([lookup[..., i] == tplsum[i] for i in range(D)]))
# Find exact match
for y, x in zip(*possible_match):
if np.all(im[y+1:y+h+1, x+1:x+w+1] == tpl):
return (y+1, x+1)
raise Exception("Image not found")
```

It works with both grayscale and color images and runs in `7ms`

for a `303x384`

color image with a `50x50`

template.

A practical example:

```
>>> from skimage import data
>>> im = gray2rgb(data.coins())
>>> tpl = im[170:220, 75:130].copy()
>>> y, x = find_image(im, tpl)
>>> y, x
(170, 75)
```

And to ilustrate the result:

Left original image, right the template. And here the exact match:

```
>>> fig, ax = plt.subplots()
>>> imshow(im)
>>> rect = Rectangle((x, y), tpl.shape[1], tpl.shape[0], edgecolor='r', facecolor='none')
>>> ax.add_patch(rect)
```

And last, just an example of the `possible_matches`

for the test:

The sum over the two windows in the image is the same, but the last step of the function filters the one that doesn't exactly match the template.

`small`

image will appear in the`large`

image always in its original size and exactly with its original values? Or you need to deal with variable size`small`

images that might be`interpolated`

and handle`illumination`

variations? I mean, you mention`exact match`

, is it really exact? – Imanol Luengo Apr 16 '15 at 7:19`PNG`

format? I ask beause`JPEG`

s undergo quantisation and lossy compression and things that are apparently identical can differ in their internal representation. – Mark Setchell Apr 16 '15 at 10:33