Super-Samples from Kernel Herding
About
We extend the herding algorithm to continuous spaces by using the kernel trick. The resulting "kernel herding" algorithm is an infinite memory deterministic process that learns to approximate a PDF with a collection of samples. We show that kernel herding decreases the error of expectations of functions in the Hilbert space at a rate O(1/T) which is much faster than the usual O(1/pT) for iid random samples. We illustrate kernel herding by approximating Bayesian predictive distributions.
Yutian Chen, Max Welling, Alex Smola• 2012
Related benchmarks
| Task | Dataset | Result | Rank | |
|---|---|---|---|---|
| Image Classification | CIFAR-10 (test) | Accuracy40.4 | 3381 | |
| Image Classification | Fashion MNIST (test) | Accuracy82.5 | 633 | |
| Image Classification | ImageWoof (test) | Accuracy40.3 | 254 | |
| Sentiment Classification | SST2 (test) | Accuracy62 | 233 | |
| Image Classification | MNIST (test) | Accuracy97.9 | 201 | |
| Sentiment Analysis | SST-5 (test) | Accuracy24.8 | 177 | |
| Semantic segmentation | COCO Stuff (val) | mIoU32.5 | 167 | |
| Sentiment Classification | MR (test) | Accuracy54.1 | 142 | |
| Question Classification | TREC (test) | Accuracy26.4 | 128 | |
| Topic Classification | AG News (test) | Accuracy38.7 | 116 |
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