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I am doing camera calibration from tsai algo. I got intrensic and extrinsic matrix, but how can I reconstruct the 3D coordinates from that inormation?

enter image description here

1) I can use Gaussian Elimination for find X,Y,Z,W and then points will be X/W , Y/W , Z/W as homogeneous system.

2) I can use the OpenCV documentation approach:

enter image description here

as I know u, v, R , t , I can compute X,Y,Z.

However both methods end up in different results that are not correct.

What am I'm doing wrong?

  • Very good answer, please, if that answer help, tick it as correct – vgonisanz Aug 24 '12 at 11:58
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If you got extrinsic parameters then you got everything. That means that you can have Homography from the extrinsics (also called CameraPose). Pose is a 3x4 matrix, homography is a 3x3 matrix, H defined as

                   H = K*[r1, r2, t],       //eqn 8.1, Hartley and Zisserman

with K being the camera intrinsic matrix, r1 and r2 being the first two columns of the rotation matrix, R; t is the translation vector.

Then normalize dividing everything by t3.

What happens to column r3, don't we use it? No, because it is redundant as it is the cross-product of the 2 first columns of pose.

Now that you have homography, project the points. Your 2d points are x,y. Add them a z=1, so they are now 3d. Project them as follows:

        p          = [x y 1];
        projection = H * p;                   //project
        projnorm   = projection / p(z);      //normalize

Hope this helps.

  • 2
    could it be that you have written the columns wrong? did you maybe mean column (r12 r22 r32) and (r13 r23 and r33) instead? – EliteTUM Jul 4 '12 at 18:14
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    I corrected the columns – Jav_Rock Jul 4 '12 at 18:21
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    I didn't get the normalize part. p/p(z) will give z of all points as 1. so how to get 3D points? – Froyo Mar 11 '13 at 10:28
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    This solution is true if the object is planar.For nonplanar object you need to have atleast two poses to recover the 3D points in object frame. – user2311339 Apr 23 '13 at 12:43
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    Homography is for planar scene only and also for such obtained by pure rotation. Fundamental matrix/essential matrix is the way to go for the general case but you need at least two views of the scene with the point in both of them as user2311339 mentioned. Then you triangulate the 3D point based on the pair of matched 2D points one in each view. – rbaleksandar Jun 29 '14 at 14:10
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As nicely stated in the comments above, projecting 2D image coordinates into 3D "camera space" inherently requires making up the z coordinates, as this information is totally lost in the image. One solution is to assign a dummy value (z = 1) to each of the 2D image space points before projection as answered by Jav_Rock.

p          = [x y 1];
projection = H * p;                   //project
projnorm   = projection / p(z);      //normalize

One interesting alternative to this dummy solution is to train a model to predict the depth of each point prior to reprojection into 3D camera-space. I tried this method and had a high degree of success using a Pytorch CNN trained on 3D bounding boxes from the KITTI dataset. Would be happy to provide code but it'd be a bit lengthy for posting here.

protected by rayryeng Feb 25 '16 at 19:17

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