Lecture 29: Face Detection Revisited

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Presentation transcript:

Lecture 29: Face Detection Revisited CS4670 / 5670: Computer Vision Noah Snavely Lecture 29: Face Detection Revisited

Remember eigenfaces? They don’t work very well for detection

Issues: speed, features Case study: Viola Jones face detector Exploits two key strategies: simple, super-efficient, but useful features pruning (cascaded classifiers) Next few slides adapted Grauman & Liebe’s tutorial http://www.vision.ee.ethz.ch/~bleibe/teaching/tutorial-aaai08/ Also see Paul Viola’s talk (video) http://www.cs.washington.edu/education/courses/577/04sp/contents.html#DM

Feature extraction “Rectangular” filters Feature output is difference between adjacent regions Value at (x,y) is sum of pixels above and to the left of (x,y) Efficiently computable with integral image: any sum can be computed in constant time Avoid scaling images  scale features directly for same cost Integral image Viola & Jones, CVPR 2001 4 K. Grauman, B. Leibe K. Grauman, B. Leibe 4

Integral Image Weights on Integral Image Original Image 34 11 33 3 19 18 2 24 8 36 5 6 15 17 22 4 7 35 1 20 10 12 29 9 27 16 25 26 31 30 28 21 32 13 23 Weights on Integral Image Original Image -1 1 Weight on Original Image IIR Filter 34 45 78 81 100 119 137 155 157 181 68 87 156 170 194 224 247 271 288 345 85 126 212 230 260 293 321 352 404 479 93 238 278 313 347 395 436 500 597 101 152 254 316 370 433 487 548 621 745 117 175 367 501 580 660 762 896 151 235 377 561 632 741 838 944 1088 184 296 468 582 684 776 911 1013 1151 1316 185 315 619 748 856 1019 1140 1310 1498 197 340 541 683 825 940 1124 1250 1422 1625 Integral Image Slide courtesy of Andrew Gallagher

Integral Image Weights on Integral Image Original Image 34 11 33 3 19 18 2 24 8 36 5 6 15 17 22 4 7 35 1 20 10 12 29 9 27 16 25 26 31 30 28 21 32 13 23 Weights on Integral Image Original Image -1 1 Weight on Original Image IIR Filter 34 45 78 81 100 119 137 155 157 181 68 87 156 170 194 224 247 271 288 345 85 126 212 230 260 293 321 352 404 479 93 238 278 313 347 395 436 500 597 101 152 254 316 370 433 487 548 621 745 117 175 367 501 580 660 762 896 151 235 377 561 632 741 838 944 1088 184 296 468 582 684 776 911 1013 1151 1316 185 315 619 748 856 1019 1140 1310 1498 197 340 541 683 825 940 1124 1250 1422 1625 Integral Image Slide courtesy of Andrew Gallagher

Integral Image Weights on Integral Image Original Image 34 11 33 3 19 18 2 24 8 36 5 6 15 17 22 4 7 35 1 20 10 12 29 9 27 16 25 26 31 30 28 21 32 13 23 Weights on Integral Image Original Image -1 1 Weight on Original Image IIR Filter 34 45 78 81 100 119 137 155 157 181 68 87 156 170 194 224 247 271 288 345 85 126 212 230 260 293 321 352 404 479 93 238 278 313 347 395 436 500 597 101 152 254 316 370 433 487 548 621 745 117 175 367 501 580 660 762 896 151 235 377 561 632 741 838 944 1088 184 296 468 582 684 776 911 1013 1151 1316 185 315 619 748 856 1019 1140 1310 1498 197 340 541 683 825 940 1124 1250 1422 1625 Integral Image Slide courtesy of Andrew Gallagher

Integral Image Weights on Integral Image Original Image 34 11 33 3 19 18 2 24 8 36 5 6 15 17 22 4 7 35 1 20 10 12 29 9 27 16 25 26 31 30 28 21 32 13 23 Weights on Integral Image Original Image -1 1 Weight on Original Image IIR Filter 34 45 78 81 100 119 137 155 157 181 68 87 156 170 194 224 247 271 288 345 85 126 212 230 260 293 321 352 404 479 93 238 278 313 347 395 436 500 597 101 152 254 316 370 433 487 548 621 745 117 175 367 501 580 660 762 896 151 235 377 561 632 741 838 944 1088 184 296 468 582 684 776 911 1013 1151 1316 185 315 619 748 856 1019 1140 1310 1498 197 340 541 683 825 940 1124 1250 1422 1625 Integral Image Slide courtesy of Andrew Gallagher

Integral Image Weights on Integral Image Original Image 34 11 33 3 19 18 2 24 8 36 5 6 15 17 22 4 7 35 1 20 10 12 29 9 27 16 25 26 31 30 28 21 32 13 23 Weights on Integral Image Original Image -1 1 Weight on Original Image IIR Filter 34 45 78 81 100 119 137 155 157 181 68 87 156 170 194 224 247 271 288 345 85 126 212 230 260 293 321 352 404 479 93 238 278 313 347 395 436 500 597 101 152 254 316 370 433 487 548 621 745 117 175 367 501 580 660 762 896 151 235 377 561 632 741 838 944 1088 184 296 468 582 684 776 911 1013 1151 1316 185 315 619 748 856 1019 1140 1310 1498 197 340 541 683 825 940 1124 1250 1422 1625 Integral Image Slide courtesy of Andrew Gallagher

Integral Image Weights on Integral Image Original Image 34 11 33 3 19 18 2 24 8 36 5 6 15 17 22 4 7 35 1 20 10 12 29 9 27 16 25 26 31 30 28 21 32 13 23 Weights on Integral Image Original Image -1 1 Weight on Original Image IIR Filter 34 45 78 81 100 119 137 155 157 181 68 87 156 170 194 224 247 271 288 345 85 126 212 230 260 293 321 352 404 479 93 238 278 313 347 395 436 500 597 101 152 254 316 370 433 487 548 621 745 117 175 367 501 580 660 762 896 151 235 377 561 632 741 838 944 1088 184 296 468 582 684 776 911 1013 1151 1316 185 315 619 748 856 1019 1140 1310 1498 197 340 541 683 825 940 1124 1250 1422 1625 Integral Image Slide courtesy of Andrew Gallagher

Integral Image Weights on Integral Image Original Image 34 11 33 3 19 18 2 24 8 36 5 6 15 17 22 4 7 35 1 20 10 12 29 9 27 16 25 26 31 30 28 21 32 13 23 Weights on Integral Image Original Image -1 1 Weight on Original Image IIR Filter 34 45 78 81 100 119 137 155 157 181 68 87 156 170 194 224 247 271 288 345 85 126 212 230 260 293 321 352 404 479 93 238 278 313 347 395 436 500 597 101 152 254 316 370 433 487 548 621 745 117 175 367 501 580 660 762 896 151 235 377 561 632 741 838 944 1088 184 296 468 582 684 776 911 1013 1151 1316 185 315 619 748 856 1019 1140 1310 1498 197 340 541 683 825 940 1124 1250 1422 1625 Integral Image Slide courtesy of Andrew Gallagher

Integral Image O(N) Operations! ~400 in this case 34 11 33 3 19 18 2 24 8 36 5 6 15 17 22 4 7 35 1 20 10 12 29 9 27 16 25 26 31 30 28 21 32 13 23 Weights on Integral Image Original Image -1 1 Weight on Original Image IIR Filter 34 45 78 81 100 119 137 155 157 181 68 87 156 170 194 224 247 271 288 345 85 126 212 230 260 293 321 352 404 479 93 238 278 313 347 395 436 500 597 101 152 254 316 370 433 487 548 621 745 117 175 367 501 580 660 762 896 151 235 377 561 632 741 838 944 1088 184 296 468 582 684 776 911 1013 1151 1316 185 315 619 748 856 1019 1140 1310 1498 197 340 541 683 825 940 1124 1250 1422 1625 O(N) Operations! ~400 in this case Integral Image Slide courtesy of Andrew Gallagher

Integral Image Sum Cost Total Cost SS 69 6 6 Integral 69 4 4 34 11 33 3 19 18 2 24 8 36 5 6 15 17 22 4 7 35 1 20 10 12 29 9 27 16 25 26 31 30 28 21 32 13 23 Sum Cost Total Cost SS 69 6 6 Integral 69 4 4 Original Image 34 45 78 81 100 119 137 155 157 181 68 87 156 170 194 224 247 271 288 345 85 126 212 230 260 293 321 352 404 479 93 238 278 313 347 395 436 500 597 101 152 254 316 370 433 487 548 621 745 117 175 367 501 580 660 762 896 151 235 377 561 632 741 838 944 1088 184 296 468 582 684 776 911 1013 1151 1316 185 315 619 748 856 1019 1140 1310 1498 197 340 541 683 825 940 1124 1250 1422 1625 SS: 17+4+6+15+22+5= 69 Integral way: 313+87-194-137= 69 Integral Image Slide courtesy of Andrew Gallagher

Integral Image Sum Cost Total Cost SS 352 24 30 Integral 352 4 8 34 11 33 3 19 18 2 24 8 36 5 6 15 17 22 4 7 35 1 20 10 12 29 9 27 16 25 26 31 30 28 21 32 13 23 Sum Cost Total Cost SS 352 24 30 Integral 352 4 8 Original Image 34 45 78 81 100 119 137 155 157 181 68 87 156 170 194 224 247 271 288 345 85 126 212 230 260 293 321 352 404 479 93 238 278 313 347 395 436 500 597 101 152 254 316 370 433 487 548 621 745 117 175 367 501 580 660 762 896 151 235 377 561 632 741 838 944 1088 184 296 468 582 684 776 911 1013 1151 1316 185 315 619 748 856 1019 1140 1310 1498 197 340 541 683 825 940 1124 1250 1422 1625 Integral way: 911+156-247-468= 352 Integral Image Slide courtesy of Andrew Gallagher

Integral Image Sum Cost Total Cost SS 141 9 39 Integral 141 4 12 34 11 33 3 19 18 2 24 8 36 5 6 15 17 22 4 7 35 1 20 10 12 29 9 27 16 25 26 31 30 28 21 32 13 23 Sum Cost Total Cost SS 141 9 39 Integral 141 4 12 Original Image 34 45 78 81 100 119 137 155 157 181 68 87 156 170 194 224 247 271 288 345 85 126 212 230 260 293 321 352 404 479 93 238 278 313 347 395 436 500 597 101 152 254 316 370 433 487 548 621 745 117 175 367 501 580 660 762 896 151 235 377 561 632 741 838 944 1088 184 296 468 582 684 776 911 1013 1151 1316 185 315 619 748 856 1019 1140 1310 1498 197 340 541 683 825 940 1124 1250 1422 1625 Integral way: 762-621= 141 Integral Image Slide courtesy of Andrew Gallagher

Large library of filters Considering all possible filter parameters: position, scale, and type: 180,000+ possible features associated with each 24 x 24 window Use AdaBoost both to select the informative features and to form the classifier Viola & Jones, CVPR 2001 K. Grauman, B. Leibe 16

AdaBoost for feature+classifier selection Want to select the single rectangle feature and threshold that best separates positive (faces) and negative (non-faces) training examples, in terms of weighted error. Resulting weak classifier: … For next round, reweight the examples according to errors, choose another filter/threshold combo. Outputs of a possible rectangle feature on faces and non-faces. Viola & Jones, CVPR 2001 K. Grauman, B. Leibe 17

AdaBoost: Intuition Consider a 2-d feature space with positive and negative examples. Each weak classifier splits the training examples with at least 50% accuracy. Examples misclassified by a previous weak learner are given more emphasis at future rounds. Figure adapted from Freund and Schapire 18 K. Grauman, B. Leibe K. Grauman, B. Leibe 18

AdaBoost: Intuition 19 K. Grauman, B. Leibe K. Grauman, B. Leibe 19

AdaBoost: Intuition Final classifier is combination of the weak classifiers 20 K. Grauman, B. Leibe K. Grauman, B. Leibe 20

AdaBoost Algorithm {x1,…xn} Start with uniform weights on training examples {x1,…xn} For T rounds Evaluate weighted error for each feature, pick best. Re-weight the examples: Incorrectly classified -> more weight Correctly classified -> less weight Final classifier is combination of the weak ones, weighted according to error they had. K. Grauman, B. Leibe Freund & Schapire 1995 21

Cascading classifiers for detection For efficiency, apply less accurate but faster classifiers first to immediately discard windows that clearly appear to be negative; e.g., Filter for promising regions with an initial inexpensive classifier Build a chain of classifiers, choosing cheap ones with low false negative rates early in the chain Fleuret & Geman, IJCV 2001 Rowley et al., PAMI 1998 Viola & Jones, CVPR 2001 22 K. Grauman, B. Leibe K. Grauman, B. Leibe Figure from Viola & Jones CVPR 2001 22

Viola-Jones Face Detector: Summary Train cascade of classifiers with AdaBoost Apply to each subwindow Faces New image Selected features, thresholds, and weights Non-faces Train with 5K positives, 350M negatives Real-time detector using 38 layer cascade 6061 features in total throughout layers [Implementation available in OpenCV: http://www.intel.com/technology/computing/opencv/] 23 K. Grauman, B. Leibe 23

Viola-Jones Face Detector: Results First two features selected 24 K. Grauman, B. Leibe K. Grauman, B. Leibe 24

Viola-Jones Face Detector: Results K. Grauman, B. Leibe 25

Viola-Jones Face Detector: Results K. Grauman, B. Leibe 26

Viola-Jones Face Detector: Results K. Grauman, B. Leibe

Detecting profile faces? Detecting profile faces requires training separate detector with profile examples. K. Grauman, B. Leibe

Viola-Jones Face Detector: Results Paul Viola, ICCV tutorial K. Grauman, B. Leibe

Questions?