# Computing camera pose with homography matrix based on 4 coplanar points

I have 4 coplanar points in a video (or image) representing a quad (not necessarily a square or rectangle) and I would like to be able to display a virtual cube on top of them where the corners of the cube stand exactly on the corners of the video quad.

Since the points are coplanar I can compute the homography between the corners of a unit square (i.e. [0,0] [0,1] [1,0] [1,1]) and the video coordinates of the quad.

From this homography I should be able to compute a correct camera pose, i.e. [R|t] where R is a 3x3 rotation matrix and t is a 3x1 translation vector so that the virtual cube lies on the video quad.

I have read many solutions (some of them on SO) and tried implementing them but they seem to work only in some "simple" cases (like when the video quad is a square) but do not work in most cases.

Here are the methods I tried (most of them are based on the same principles, only the computation of the translation are slightly different). Let K be the intrinsics matrix from the camera and H be the homography. We compute:

``````A = K-1 * H
``````

Let a1,a2,a3 be the column vectors of A and r1,r2,r3 the column vectors of the rotation matrix R.

``````r1 = a1 / ||a1||
r2 = a2 / ||a2||
r3 = r1 x r2
t = a3 / sqrt(||a1||*||a2||)
``````

The issue is that this does not work in most cases. In order to check my results, I compared R and t with those obtained by OpenCV's solvePnP method (using the following 3D points [0,0,0] [0,1,0] [1,0,0] [1,1,0]).

Since I display the cube in the same way, I noticed that in every case solvePnP provides correct results, while the pose obtained from the homography is mostly wrong.

In theory since my points are coplanar, it is possible to compute the pose from a homography but I couldn't find the correct way to compute the pose from H.

Any insights on what I am doing wrong?

Edit after trying @Jav_Rock's method

Hi Jav_Rock, thanks very much for your answer, I tried your approach (and many others as well) which seems to be more or less OK. Nevertheless I still happen to have some issues when computing the pose based on 4 coplanar point. In order to check the results I compare with results from solvePnP (which will be much better due to the iterative reprojection error minimization approach).

Here is an example:

Yellow cube: Solve PNP Black Cube: Jav_Rock's technique Cyan (and Purple) cube(s): some other techniques given the exact same results

As you can see, the black cube is more or less OK but doesn't seem well proportioned, although the vectors seem orthonormal.

EDIT2: I normalized v3 after computing it (in order to enforce orthonormality) and it seems to solve some problems as well.

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So opencv's solvepnp provides correct results while your implementation is wrong ? –  nav Jan 28 '12 at 16:40
Yes solvePnP gives correct results while my implementation using homographies only does not gives correct rotation/translation vectors. –  JimN Jan 30 '12 at 14:15
If you share your code we can go through it and see how it can be fixed. One thing you might have forgotten is to enforce orthonormality of the rotation matrix. –  Heslil May 26 '12 at 17:52
I believe you have all the steps you need: 1.-Obtain camera intrinsics 2.-Define 4-point correspondences and compute H with DLT 3.-Left-multiply H with K.inv() 4.-Decompose the result as explained by @Jav_Rock –  marcos.nieto Oct 25 '13 at 17:22

If you have your Homography, you can calculate the camera pose with something like this:

``````void cameraPoseFromHomography(const Mat& H, Mat& pose)
{
pose = Mat::eye(3, 4, CV_32FC1);      // 3x4 matrix, the camera pose
float norm1 = (float)norm(H.col(0));
float norm2 = (float)norm(H.col(1));
float tnorm = (norm1 + norm2) / 2.0f; // Normalization value

Mat p1 = H.col(0);       // Pointer to first column of H
Mat p2 = pose.col(0);    // Pointer to first column of pose (empty)

cv::normalize(p1, p2);   // Normalize the rotation, and copies the column to pose

p1 = H.col(1);           // Pointer to second column of H
p2 = pose.col(1);        // Pointer to second column of pose (empty)

cv::normalize(p1, p2);   // Normalize the rotation and copies the column to pose

p1 = pose.col(0);
p2 = pose.col(1);

Mat p3 = p1.cross(p2);   // Computes the cross-product of p1 and p2
Mat c2 = pose.col(2);    // Pointer to third column of pose
p3.copyTo(c2);       // Third column is the crossproduct of columns one and two

pose.col(3) = H.col(2) / tnorm;  //vector t [R|t] is the last column of pose
}
``````

This method works form me. Good luck.

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Can you comment on what is happening in the code? –  Rui Marques Jun 15 '12 at 14:21
Hi Jav_Rock, thanks very much for your answer, I tried your method and edited the post so that you can see the obtained results. Thanks again. –  JimN Jun 20 '12 at 9:16
I think the image is not visible. Anyway, if you want to go deeper into theory you can read this question from the dsp.stackexchange dsp.stackexchange.com/q/2736/1473 –  Jav_Rock Jun 29 '12 at 13:37
Either I'm not getting it right (code is 100% the same as yours) or OpenCV has changed in the way it handles the Mat-object since you've posted this answer. Using assignments such as yours (p1,p2...) does NOT change the pose-argument and leads to a resulting pose identical to its initialization - a 3x4 identity matrix. Using copyTo() resolves the issue. It seems that deep copy is necessary. Check @Jacob's reply at stackoverflow.com/questions/6411476/… –  rbaleksandar Jun 19 at 14:28