English

Approximate quadrature measures on data--defined spaces

Numerical Analysis 2017-09-06 v2

Abstract

An important question in the theory of approximate integration is to study the conditions on the nodes xk,nx_{k,n} and weights wk,nw_{k,n} that allow an estimate of the form supfBγkwk,nf(xk,n)Xfdμcnγ,n=1,2,, \sup_{f\in \mathcal{B}_\gamma}|\sum_k w_{k,n}f(x_{k,n})-\int_\mathbb{X} fd\mu^*| \le cn^{-\gamma}, \qquad n=1,2,\cdots, where X\mathbb{X} is often a manifold with its volume measure μ\mu^*, and Bγ\mathcal{B}_\gamma is the unit ball of a suitably defined smoothness class, parametrized by γ\gamma. In this paper, we study this question in the context of a quasi-metric, locally compact, measure space X\mathbb{X} with a probability measure μ\mu^*. We show that quadrature formulas exact for integrating the so called diffusion polynomials of degree <n<n satisfy such estimates. Without requiring exactness, such formulas can be obtained as a solutions of some kernel-based optimization problem. We discuss the connection with the question of optimal covering radius. Our results generalize in some sense many recent results in this direction.

Keywords

Cite

@article{arxiv.1612.02368,
  title  = {Approximate quadrature measures on data--defined spaces},
  author = {Hrushikesh N. Mhaskar},
  journal= {arXiv preprint arXiv:1612.02368},
  year   = {2017}
}

Comments

30 pages; Accepted for publication in "Festschrift for the 80th Birthday of Ian Sloan" (Josef Dick, Frances Y Kuo, Henryk Wozniakowski, Editors), Springer Verlag

R2 v1 2026-06-22T17:16:37.829Z