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CENG 789 – Digital Geometry Processing 06- Rigid-Body Alignment Asst. Prof. Yusuf Sahillioğlu Computer Eng. Dept,, Turkey
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Rigid vs. Non-rigid 2 / 39 Rigid shapesNon-rigid shape (Differ by rigid vs. (Differ by non-rigid transformatns transformations = rigid + bending) = rotation & translation)
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Rigid vs. Non-rigid 3 / 39 Rigid shapesNon-rigid shape (Easier to align/register vs. (Harder to align/register due to low degree- due to high DOF) of-freedom)
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Rigid vs. Non-rigid 4 / 39 Rigid shapesNon-rigid shape (Main app: 3D scan registration) vs. (Main apps: shape completion & attribute transfer via shape correspondence)
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Rigid Alignment 5 / 39 We will do rigid-body alignment this lecture. Easier scenario: Alignment of 2 complete shapes.
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Rigid Alignment 6 / 39 We will do rigid-body alignment this lecture. Easier scenario: Alignment of 2 complete shapes. Translation disambiguation handled by moving centers to the origin.
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Rigid Alignment 7 / 39 We will do rigid-body alignment this lecture. Easier scenario: Alignment of 2 complete shapes. Rotation disambiguation handled by PCA. PCA on covariance matrix C that encodes variances between x,y,z coordinate pairs of all n shape points.
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Rigid Alignment 8 / 39 We will do rigid-body alignment this lecture. Easier scenario: Alignment of 2 complete shapes. Rotation disambiguation handled by PCA. PCA on covariance matrix C that encodes variances between x,y,z coordinate pairs of all n shape points. Eigenvectors of C provide principal axes/directions (of variations) of the shape, which are then aligned w/ the standard Euclidean axes. Same alignment is applied to the 2 nd shape.
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Rigid Alignment 9 / 39 We will do rigid-body alignment this lecture. Easier scenario: Alignment of 2 complete shapes. Rotation disambiguation handled by PCA. Align principal axes w/ the standard Euclidean axes; e.g., align w/ y-axis.
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Rigid Alignment 10 / 39 We will do rigid-body alignment this lecture. Easier scenario: Alignment of 2 complete shapes. Rotation disambiguation handled by PCA. Align principal axes w/ the standard Euclidean axes; e.g., align w/ y-axis.
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Rigid Alignment 11 / 39 We will do rigid-body alignment this lecture. Easier scenario: Alignment of 2 complete shapes. Rotation disambiguation handled by PCA. Align principal axes w/ the standard Euclidean axes; e.g., align w/ y-axis.
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Rigid Alignment 12 / 39 We will do rigid-body alignment this lecture. Easier scenario: Alignment of 2 complete shapes. Rotation disambiguation handled by PCA. Align principal axes w/ the standard Euclidean axes; e.g., align w/ y-axis. Blue (zAngle) and dark (xAngle) angles?
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Rigid Alignment 13 / 39 We will do rigid-body alignment this lecture. Easier scenario: Alignment of 2 complete shapes. Rotation disambiguation handled by PCA. Align principal axes w/ the standard Euclidean axes; e.g., align w/ y-axis. Blue (zAngle) and dark (xAngle) angles?
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Rigid Alignment 14 / 39 We will do rigid-body alignment this lecture. Easier scenario: Alignment of 2 complete shapes. Rotation disambiguation handled by PCA. Align principal axes w/ the standard Euclidean axes; e.g., align w/ y-axis. This was cool; but not exactly solving our alignment problem It rather moves object from one position to another within a single reference frame. In our case we want switching coordinates from one system (principles) to another (Euclidean); like this: Tables, chairs, and other furniture is defined in a local (modeling) coordinate system. They can be placed into a room, defined in another coordinate system, by transforming furniture (modeling) coordinates to room (world) coordinates.
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Rigid Alignment 15 / 39 We will do rigid-body alignment this lecture. Easier scenario: Alignment of 2 complete shapes. Rotation disambiguation handled by PCA. Align principal axes w/ the standard Euclidean axes; e.g., align w/ y-axis. Switching coordinates from one system (principles) to another (Euclidean).
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Rigid Alignment 16 / 39 We will do rigid-body alignment this lecture. Harder scenario: Alignment of 2 partial shapes. PCA-based solution is a global approach. Based on variations on coordinates. Two shapes that partial overlapping will have different variations; PCA fails.
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Rigid Alignment 17 / 39 We will do rigid-body alignment this lecture. Harder scenario: Alignment of 2 partial shapes. Partial shapes arise frequently in life: 3D scans. Handle them using Direct rotation computation (when map b/w 2 shapes known). Iterative Closest Point algorithm (when map unknown). RANSAC (when map unknown).
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Rigid Alignment 18 / 39 If map/correspondences are known, we can derive rotation and translation that aligns the 1 st shape with the 2 nd.
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Rigid Alignment 19 / 39 If map/correspondences are known, we can derive rotation and translation that aligns the 1 st shape with the 2 nd.
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Rigid Alignment 20 / 39 If map/correspondences are known, we can derive rotation and translation that aligns the 1 st shape with the 2 nd. Do energy functional minimization using matrix algebra. Take the derivative of E(x) w.r.t. x and search for its roots.
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Rigid Alignment 21 / 39 Translation.
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Rigid Alignment 22 / 39 Rotation. Recall SVD:
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Rigid Alignment 23 / 39 Iterative Closest Point algorithm (when map b/w 2 shapes unknown). Assume closest points correspond. Compute the rotation and translation based on this correspondence/map. Update coordinates and re-compute closest-point correspondences. Re-compute rotation and translation based on this map. Repeat.
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Rigid Alignment 24 / 39 Iterative Closest Point algorithm (when map b/w 2 shapes unknown). Original ICP paper (Besl & McKay, A Method for Registration of 3-D Shapes, PAMI, 1992) uses closed-form solution to compute the rotations (unlike our least-squares solution in prev. slides). Converges if starting point is close enough. For efficiency, you can do sampling on point sets. Also, use k-d trees. For accuracy, you can replace your matching criteria (point to plane).
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Rigid Alignment 25 / 39 Iterative Closest Point algorithm (when map b/w 2 shapes unknown). Resulting ICP session; pretty robust:
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Rigid Alignment 26 / 39 Iterative Closest Point algorithm (when map b/w 2 shapes unknown). Basic ICP algo; again:
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Rigid Alignment 27 / 39 Iterative Closest Point algorithm (when map b/w 2 shapes unknown). Better correspondence estimation via feature points.
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Rigid Alignment 28 / 39 Iterative Closest Point algorithm (when map b/w 2 shapes unknown). Better correspondence estimation via feature points. Goal is to identify when 2 points on different scans represent the same feature. If this is done perfectly, you do not need to iterate (ICP). You just compute rotations and translations in one shot.
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Rigid Alignment 29 / 39 Iterative Closest Point algorithm (when map b/w 2 shapes unknown). Better correspondence estimation via feature points. Goal is to identify when 2 points on different scans represent the same feature. Hint: Are the surroundings similar?
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Rigid Alignment 30 / 39 Iterative Closest Point algorithm (when map b/w 2 shapes unknown). Better correspondence estimation via feature points. Goal is to identify when 2 points on different scans represent the same feature. Hint: Are the surroundings similar? Recall rotation-invariant shape histograms descriptor.
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Rigid Alignment 31 / 39 Iterative Closest Point algorithm (when map b/w 2 shapes unknown). Better correspondence estimation via feature points. Goal is to identify when 2 points on different scans represent the same feature. Hint: Are the surroundings similar? Lots of descriptors defined over the years.
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Rigid Alignment 32 / 39 Iterative Closest Point algorithm (when map b/w 2 shapes unknown). Better correspondence estimation via feature points. Goal is to identify when 2 points on different scans represent the same feature. Hint: Are the surroundings similar? One of my favorites: shape diameter function (for non-rigid case).
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Rigid Alignment 33 / 39 RANSAC (when map b/w 2 shapes unknown). ICP only needs 3 point pairs to define a rotation in 3D. RANSAC algo. Pick a random pair of 3 points on 2 shapes. Estimate alignment (compute rotation translation) in the least-squares sense. Check for the error of this alignment (e.g. sum of distnces b/w matching pnts).
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Rigid Alignment 34 / 39 RANSAC (when map b/w 2 shapes unknown). ICP only needs 3 point pairs to define a rotation in 3D. RANSAC algo. Pick a random pair of 3 points on 2 shapes. Estimate alignment (compute rotation translation) in the least-squares sense. Check for the error of this alignment (e.g. sum of distnces b/w matching pnts).
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Rigid Alignment 35 / 39 RANSAC (when map b/w 2 shapes unknown). ICP only needs 3 point pairs to define a rotation in 3D. RANSAC algo. Pick a random pair of 3 points on 2 shapes. Estimate alignment (compute rotation translation) in the least-squares sense. Check for the error of this alignment (e.g. sum of distnces b/w matching pnts).
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Rigid Alignment 36 / 39 RANSAC (when map b/w 2 shapes unknown). ICP only needs 3 point pairs to define a rotation in 3D. RANSAC algo. Pick a random pair of 3 points on 2 shapes. Estimate alignment (compute rotation translation) in the least-squares sense. Check for the error of this alignment (e.g. sum of distnces b/w matching pnts).
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Rigid Alignment 37 / 39 RANSAC (when map b/w 2 shapes unknown). ICP only needs 3 point pairs to define a rotation in 3D. RANSAC algo. Pick a random pair of 3 points on 2 shapes. Estimate alignment (compute rotation translation) in the least-squares sense. Check for the error of this alignment (e.g. sum of distnces b/w matching pnts). Random picks do not have to be exact.
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Rigid Alignment 38 / 39 RANSAC (when map b/w 2 shapes unknown). ICP only needs 3 point pairs to define a rotation in 3D. Resulting RANSAC session:
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Rigid Alignment 39 / 39 RANSAC (when map b/w 2 shapes unknown). ICP only needs 3 point pairs to define a rotation in 3D. Resulting RANSAC session:
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