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Probability error bounds for approximation of functions in reproducing kernel Hilbert spaces

Numerical Analysis 2024-02-26 v2 Information Theory Numerical Analysis Functional Analysis math.IT

Abstract

We find probability error bounds for approximations of functions ff in a separable reproducing kernel Hilbert space H\mathcal{H} with reproducing kernel KK on a base space XX, firstly in terms of finite linear combinations of functions of type KxiK_{x_i} and then in terms of the projection πxn\pi^n_x on Span{Kxi}i=1n\mathrm{Span}\{K_{x_i}\}^n_{i=1}, for random sequences of points x=(xi)ix=(x_i)_i in XX. Given a probability measure PP, letting PKP_K be the measure defined by dPK(x)=K(x,x)dP(x)\mathrm{d} P_K(x)=K(x,x)\mathrm{d} P(x), xXx\in X, our approach is based on the nonexpansive operator L2(X;PK)λLP,Kλ:=Xλ(x)KxdP(x)H,L^2(X;P_K)\ni\lambda\mapsto L_{P,K}\lambda:=\int_X \lambda(x)K_x\mathrm{d} P(x)\in \mathcal{H}, where the integral exists in the Bochner sense. Using this operator, we then define a new reproducing kernel Hilbert space, denoted by HP\mathcal{H}_P, that is the operator range of LP,KL_{P,K}. Our main result establishes bounds, in terms of the operator LP,KL_{P,K}, on the probability that the Hilbert space distance between an arbitrary function fHf\in\mathcal{H} and linear combinations of functions of type KxiK_{x_i}, for (xi)i(x_i)_i sampled independently from PP, falls below a given threshold. For sequences of points (xi)i=1(x_i)_{i=1}^\infty constituting a so-called uniqueness set, the orthogonal projections πxn\pi^n_x to Span{Kxi}i=1n\mathrm{Span}\{K_{x_i}\}^n_{i=1} converge in the strong operator topology to the identity operator. We prove that, under the assumption that HP\mathcal{H}_P is dense in H\mathcal{H}, any sequence of iid samples from PP yields a uniqueness set with probability 11. This result improves on previous error bounds in weaker norms, such as uniform or LpL^p norms, which yield only convergence in probability and not a.c. convergence. Two examples that show the applicability of this result to a uniform distribution on a compact interval and to the Hardy space H2(D)H^2(\mathbb{D}) are presented as well.

Keywords

Cite

@article{arxiv.2003.12801,
  title  = {Probability error bounds for approximation of functions in reproducing kernel Hilbert spaces},
  author = {Ata Deniz Aydin and Aurelian Gheondea},
  journal= {arXiv preprint arXiv:2003.12801},
  year   = {2024}
}

Comments

24 pages

R2 v1 2026-06-23T14:30:16.028Z