English

New Bounds for Kernel Sums via Fast Spherical Embeddings

Data Structures and Algorithms 2026-05-05 v1 Machine Learning

Abstract

We study query time bounds for the fundamental problem of estimating the kernel mean 1XxXk(x,y)\frac1{|X|}\sum_{x\in X}\mathbf{k}(x,y) of a query yy in a finite dataset XRdX\subset\mathbb{R}^d up to a prescribed additive error ε\varepsilon. The best known bounds for the Gaussian kernel are O(d/ε2)O(d/\varepsilon^2), O~(d+1/ε4)\widetilde O(d+1/\varepsilon^4), and O~(d+Δ2/ε2)\widetilde O(d+\Delta^2/\varepsilon^2), where Δ\Delta is the diameter of a region containing the points. We prove the new bound O~(d+εΔ2+1/ε3)\tilde O(d+\varepsilon\Delta^2+1/\varepsilon^3), which improves over the previous ones in regimes with small error ε\varepsilon and intermediate diameter Δ\Delta. At the center of our proof is a new fast spherical embedding theorem in the sense introduced by Bartal, Recht and Schulman (2011), which limits the embedded data diameter while preserving local Euclidean distances and avoiding ``distance collapse'' at larger scales. This fast embedding theorem may be of independent interest.

Keywords

Cite

@article{arxiv.2605.01263,
  title  = {New Bounds for Kernel Sums via Fast Spherical Embeddings},
  author = {Tal Wagner},
  journal= {arXiv preprint arXiv:2605.01263},
  year   = {2026}
}

Comments

ICML 2026

R2 v1 2026-07-01T12:46:20.250Z