English

Inner-product Kernels are Asymptotically Equivalent to Binary Discrete Kernels

Machine Learning 2019-09-17 v1 Machine Learning

Abstract

This article investigates the eigenspectrum of the inner product-type kernel matrix pK={f(xiTxj/p)}i,j=1n\sqrt{p} \mathbf{K}=\{f( \mathbf{x}_i^{\sf T} \mathbf{x}_j/\sqrt{p})\}_{i,j=1}^n under a binary mixture model in the high dimensional regime where the number of data nn and their dimension pp are both large and comparable. Based on recent advances in random matrix theory, we show that, for a wide range of nonlinear functions ff, the eigenspectrum behavior is asymptotically equivalent to that of an (at most) cubic function. This sheds new light on the understanding of nonlinearity in large dimensional problems. As a byproduct, we propose a simple function prototype valued in (1,0,1) (-1,0,1) that, while reducing both storage memory and running time, achieves the same (asymptotic) classification performance as any arbitrary function ff.

Cite

@article{arxiv.1909.06788,
  title  = {Inner-product Kernels are Asymptotically Equivalent to Binary Discrete Kernels},
  author = {Zhenyu Liao and Romain Couillet},
  journal= {arXiv preprint arXiv:1909.06788},
  year   = {2019}
}
R2 v1 2026-06-23T11:15:41.054Z