TY - JOUR
T1 - On the Expressive Power of Kernel Methods and the Efficiency of Kernel Learning by Association Schemes
AU - Kothari, Pravesh K.
AU - Livni, Roi
N1 - Publisher Copyright:
© 2020 P.k. Kothari & R. Livni.
PY - 2020
Y1 - 2020
N2 - We study the expressive power of kernel methods and the algorithmic feasibility of multiple kernel learning for a special rich class of kernels. Specifically, we define Euclidean kernels, a diverse class that includes most, if not all, families of kernels studied in literature such as polynomial kernels and radial basis functions. We then describe the geometric and spectral structure of this family of kernels over the hypercube (and to some extent for any compact domain). Our structural results allow us to prove meaningful limitations on the expressive power of the class as well as derive several efficient algorithms for learning kernels over different domains.
AB - We study the expressive power of kernel methods and the algorithmic feasibility of multiple kernel learning for a special rich class of kernels. Specifically, we define Euclidean kernels, a diverse class that includes most, if not all, families of kernels studied in literature such as polynomial kernels and radial basis functions. We then describe the geometric and spectral structure of this family of kernels over the hypercube (and to some extent for any compact domain). Our structural results allow us to prove meaningful limitations on the expressive power of the class as well as derive several efficient algorithms for learning kernels over different domains.
UR - http://www.scopus.com/inward/record.url?scp=85108622607&partnerID=8YFLogxK
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AN - SCOPUS:85108622607
SN - 2640-3498
VL - 117
SP - 422
EP - 450
JO - Proceedings of Machine Learning Research
JF - Proceedings of Machine Learning Research
T2 - 31st International Conference on Algorithmic Learning Theory, ALT 2020
Y2 - 8 February 2020 through 11 February 2020
ER -