Refinement of Reproducing Kernels

JMLR 2009 pp. 107-140

/jmlr/2009/xu2009jmlr-refinement/

Abstract

We continue our recent study on constructing a refinement kernel for a given kernel so that the reproducing kernel Hilbert space associated with the refinement kernel contains that with the original kernel as a subspace. To motivate this study, we first develop a refinement kernel method for learning, which gives an efficient algorithm for updating a learning predictor. Several characterizations of refinement kernels are then presented. It is shown that a nontrivial refinement kernel for a given kernel always exists if the input space has an infinite cardinal number. Refinement kernels for translation invariant kernels and Hilbert-Schmidt kernels are investigated. Various concrete examples are provided.

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Cite

Text

Xu and Zhang. "Refinement of Reproducing Kernels." Journal of Machine Learning Research, 2009.

Markdown

[Xu and Zhang. "Refinement of Reproducing Kernels." Journal of Machine Learning Research, 2009.](https://mlanthology.org/jmlr/2009/xu2009jmlr-refinement/)

BibTeX

@article{xu2009jmlr-refinement,
  title     = {{Refinement of Reproducing Kernels}},
  author    = {Xu, Yuesheng and Zhang, Haizhang},
  journal   = {Journal of Machine Learning Research},
  year      = {2009},
  pages     = {107-140},
  volume    = {10},
  url       = {https://mlanthology.org/jmlr/2009/xu2009jmlr-refinement/}
}