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Line 62: '''Proof:''' It suffices to prove the case of <math>D=1</math>. Use the trigonometric identity <math>\cos(a-b) = \cos(a)\cos(b) + \sin(a)\sin(b)</math>, the spherical symmetry of gaussian distribution, then evaluate the integral <math>\int_{-\infty}^{\infty} \frac{\cos (k x) e^{-x^2 / 2}}{\sqrt{2 \pi}} d x=e^{-k^2 / 2}</math>. '''Theorem:''' ~~The variance of the estimator is~~ <math>Var[\~~propto~~langle \varphi(x), \varphi(y)\rangle] = O(D^{-1})</math>. (Appendix A.2<ref>{{Cite journal \|last=Peng \|first=Hao \|last2=Pappas \|first2=Nikolaos \|last3=Yogatama \|first3=Dani \|last4=Schwartz \|first4=Roy \|last5=Smith \|first5=Noah A. \|last6=Kong \|first6=Lingpeng \|date=2021-03-19 \|title=Random Feature Attention \|url=http://arxiv.org/abs/2103.02143 \|journal=arXiv:2103.02143 [cs]}}</ref>). === Nyström method ===

Radial basis function kernel: Difference between revisions