This is just a simple misunderstanding of the documentation, and I don't blame you---it took me a few fumblings to understand it, too. The docs are clear, but this function probably doesn't work in the way you expect; in fact, it works in the *opposite* direction from what I expected at first.

What `remap()`

*doesn't* do is take the coordinates of your source image, transform the points, and then interpolate. What `remap()`

*does* do is, for every pixel in the *destination* image, lookup *where it comes from* in the source image, and then assigns an interpolated value. It needs to work this way since, in order to interpolate, it needs to look at the values around the source image at each pixel. Let me expand (might repeat myself a bit, but don't take it the wrong way).

From the `remap()`

docs:

**map1** – The first map of either `(x,y)`

points or just `x`

values having the type `CV_16SC2`

, `CV_32FC1`

, or `CV_32FC2`

. See `convertMaps()`

for details on converting a floating point representation to fixed-point for speed.

**map2** – The second map of `y`

values having the type `CV_16UC1`

, `CV_32FC1`

, or none (empty map if `map1`

is `(x,y)`

points), respectively.

The verbage here on `map1`

with "the *first* map of..." is somewhat misleading. Remember, these are strictly the coordinates of where your image gets mapped *from*...the points are being mapped *from* `src`

at `map_x(x, y), map_y(x, y)`

and then placed into `dst`

at `x, y`

. And they should be the same shape of the image you want to warp them *to*. Note the equation shown in the docs:

```
dst(x,y) = src(map_x(x,y),map_y(x,y))
```

Here `map_x(x, y)`

is looking up `map_x`

at the rows and columns given by `x, y`

. Then the image is evaluated at those points. It's looking up the mapped coordinates of `x, y`

in `src`

, and then assigning that value to `x, y`

in `dst`

. If you stare at this long enough, it starts to make some sense. At pixel `(0, 0)`

in the new destination image, I look at `map_x`

and `map_y`

which tell me the location of the corresponding pixel in the source image, and then I can assign an interpolated value at `(0, 0)`

in the destination image by looking at near values in the source. This is sort of the fundamental reason why `remap()`

works this way; it needs to know *where a pixel came from* so it can see neighboring pixels to interpolate.

## Small, contrived example

```
img = np.uint8(np.random.rand(8, 8)*255)
#array([[230, 45, 153, 233, 172, 153, 46, 29],
# [172, 209, 186, 30, 197, 30, 251, 200],
# [175, 253, 207, 71, 252, 60, 155, 124],
# [114, 154, 121, 153, 159, 224, 146, 61],
# [ 6, 251, 253, 123, 200, 230, 36, 85],
# [ 10, 215, 38, 5, 119, 87, 8, 249],
# [ 2, 2, 242, 119, 114, 98, 182, 219],
# [168, 91, 224, 73, 159, 55, 254, 214]], dtype=uint8)
map_y = np.array([[0, 1], [2, 3]], dtype=np.float32)
map_x = np.array([[5, 6], [7, 10]], dtype=np.float32)
mapped_img = cv2.remap(img, map_x, map_y, cv2.INTER_LINEAR)
#array([[153, 251],
# [124, 0]], dtype=uint8)
```

So what's happening here? Remember these are the indices of `img`

that will get mapped TO the row and column they are situated at. In this case it's easiest to examine the matrices:

```
map_y
=====
0 1
2 3
map_x
=====
5 6
7 10
```

So the destination image at (0, 0) has the same value as the source image at `map_y(0, 0), map_x(0, 0) = 0, 5`

and the source image at row 0 and column 5 is 153. Note that in the destination image `mapped_img[0, 0] = 153`

. No interpolation is happening here since my map coordinates are exact integers. Also I included an out-of-bounds index (`map_x[1, 1] = 10`

, which is larger than the image width), and notice that it just gets assigned the value `0`

when it's out-of-bounds.

## Full use-case example

Here's a full-fledged code example, using a ground truth homography, warping the pixel locations manually, and using `remap()`

to then map the image from the transformed points. Note here that my homography transforms `true_dst`

*to* `src`

. Thus, I make a set of however many points I want, and then calculate where those points lie in the source image by transforming with the homography. Then `remap()`

is used to look up those points in the source image, and map them into the destination image.

```
import numpy as np
import cv2
# read images
true_dst = cv2.imread("img1.png")
src = cv2.imread("img2.png")
# ground truth homography from true_dst to src
H = np.array([
[8.7976964e-01, 3.1245438e-01, -3.9430589e+01],
[-1.8389418e-01, 9.3847198e-01, 1.5315784e+02],
[1.9641425e-04, -1.6015275e-05, 1.0000000e+00]])
# create indices of the destination image and linearize them
h, w = true_dst.shape[:2]
indy, indx = np.indices((h, w), dtype=np.float32)
lin_homg_ind = np.array([indx.ravel(), indy.ravel(), np.ones_like(indx).ravel()])
# warp the coordinates of src to those of true_dst
map_ind = H.dot(lin_homg_ind)
map_x, map_y = map_ind[:-1]/map_ind[-1] # ensure homogeneity
map_x = map_x.reshape(h, w).astype(np.float32)
map_y = map_y.reshape(h, w).astype(np.float32)
# remap!
dst = cv2.remap(src, map_x, map_y, cv2.INTER_LINEAR)
blended = cv2.addWeighted(true_dst, 0.5, dst, 0.5, 0)
cv2.imshow('blended.png', blended)
cv2.waitKey()
```

Images and ground truth homographies from the Visual Geometry Group at Oxford.

`(2, 2)`

first off but what values were you expecting? – alkasm Oct 2 '17 at 11:32