Motion Estimation Today’s Readings Trucco & Verri, 8.3 – 8.4 (skip 8.3.3, read only top half of p. 199) Newton's method Wikpedia page

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Presentation transcript:

Motion Estimation Today’s Readings Trucco & Verri, 8.3 – 8.4 (skip 8.3.3, read only top half of p. 199) Newton's method Wikpedia page

Copyright A.Kitaoka 2003A.Kitaoka

Why estimate motion? Lots of uses Track object behavior Correct for camera jitter (stabilization) Align images (mosaics) 3D shape reconstruction Special effects Video slow motion Video super-resolution

Motion estimation Input: sequence of images Output: point correspondence Feature tracking we’ve seen this already (e.g., SIFT) can modify this to be more efficient Pixel tracking: “Optical Flow” today’s lecture

Optical flow

Problem definition: optical flow How to estimate pixel motion from image H to image I? Solve pixel correspondence problem –given a pixel in H, look for nearby pixels of the same color in I Key assumptions color constancy: a point in H looks the same in I –For grayscale images, this is brightness constancy small motion: points do not move very far This is called the optical flow problem

Optical flow constraints (grayscale images) Let’s look at these constraints more closely brightness constancy: Q: what’s the equation? small motion: (u and v are less than 1 pixel) –suppose we take the Taylor series expansion of I:

Optical flow equation Combining these two equations In the limit as u and v go to zero, this becomes exact

Optical flow equation Q: how many unknowns and equations per pixel? Intuitively, what does this constraint mean? The component of the flow in the gradient direction is determined The component of the flow parallel to an edge is unknown This explains the Barber Pole illusion

Aperture problem

Solving the aperture problem How to get more equations for a pixel? Basic idea: impose additional constraints –most common is to assume that the flow field is smooth locally –one method: pretend the pixel’s neighbors have the same (u,v) »If we use a 5x5 window, that gives us 25 equations per pixel!

Lucas-Kanade flow Prob: we have more equations than unknowns The summations are over all pixels in the K x K window This technique was first proposed by Lucas & Kanade (1981) –described in Trucco & Verri reading Solution: solve least squares problem minimum least squares solution given by solution (in d) of:

Conditions for solvability Optimal (u, v) satisfies Lucas-Kanade equation When is This Solvable? A T A should be invertible A T A should not be too small due to noise –eigenvalues  1 and  2 of A T A should not be too small A T A should be well-conditioned –  1 /  2 should not be too large (  1 = larger eigenvalue) Does this look familiar? A T A is the Harris matrix

Observation This is a two image problem BUT Can measure sensitivity by just looking at one of the images! This tells us which pixels are easy to track, which are hard –very useful later on when we do feature tracking...

Errors in Lucas-Kanade What are the potential causes of errors in this procedure? Suppose A T A is easily invertible Suppose there is not much noise in the image When our assumptions are violated Brightness constancy is not satisfied The motion is not small A point does not move like its neighbors –window size is too large –what is the ideal window size?

Can solve using Newton’s method –Also known as Newton-Raphson method –Today’s reading (first four pages) » Approach so far does one iteration of Newton’s method –Better results are obtained via more iterations Improving accuracy Recall our small motion assumption This is not exact To do better, we need to add higher order terms back in: This is a polynomial root finding problem 1D case on board

Iterative Refinement Iterative Lucas-Kanade Algorithm 1.Estimate velocity at each pixel by solving Lucas-Kanade equations 2.Warp H towards I using the estimated flow field - use image warping techniques 3.Repeat until convergence

Revisiting the small motion assumption Is this motion small enough? Probably not—it’s much larger than one pixel (2 nd order terms dominate) How might we solve this problem?

20 Reduce the resolution!

image I image H Gaussian pyramid of image HGaussian pyramid of image I image I image H u=10 pixels u=5 pixels u=2.5 pixels u=1.25 pixels Coarse-to-fine optical flow estimation

image I image J Gaussian pyramid of image HGaussian pyramid of image I image I image H Coarse-to-fine optical flow estimation run iterative L-K warp & upsample......

Flow quality evaluation

Middlebury flow page Ground Truth

Flow quality evaluation Middlebury flow page Ground TruthLucas-Kanade flow

Flow quality evaluation Middlebury flow page Ground TruthBest-in-class alg (as of 2/26/12)