A doubly-randomized feature map for Bernstein-Schur kernels achieves unbiased kernel approximation with variance and operator-norm bounds controlled by effective dimension rather than crude maxima.
Random Features for Compositional Kernels
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abstract
We describe and analyze a simple random feature scheme (RFS) from prescribed compositional kernels. The compositional kernels we use are inspired by the structure of convolutional neural networks and kernels. The resulting scheme yields sparse and efficiently computable features. Each random feature can be represented as an algebraic expression over a small number of (random) paths in a composition tree. Thus, compositional random features can be stored compactly. The discrete nature of the generation process enables de-duplication of repeated features, further compacting the representation and increasing the diversity of the embeddings. Our approach complements and can be combined with previous random feature schemes.
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cs.LG 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Bernstein-Schur Kernels: Random Features by Sketched Modulation and Radial Randomization
A doubly-randomized feature map for Bernstein-Schur kernels achieves unbiased kernel approximation with variance and operator-norm bounds controlled by effective dimension rather than crude maxima.