Quasi-interpolation with random sampling centers
Abstract
We propose and study a general quasi-interpolation framework for stochastic function approximation, which stems and draws motivation from convolution-type solutions for certain practical weighted variational problems. We obtain our quasi-interpolants using Monte Carlo discretization of the pertinent integrals and establish a family of -McDiarmid-type concentration inequalities for , which resulted in verifiable expected error estimates for the stochastic quasi-interpolants. The -version of these concentration inequalities is dynamically-independent of dimensions, which offers a partial stochastic mitigation of the so called ``curse of dimensionality". The -version of these concentration inequalities strengthens the existing expected -error estimates in the literature. Numerical simulation results are provided at the end of the paper to validate the underlying theoretical analysis.
Cite
@article{arxiv.2512.19988,
title = {Quasi-interpolation with random sampling centers},
author = {Wenwu Gao and Le Hu and Xingping Sun and Xuan Zhou},
journal= {arXiv preprint arXiv:2512.19988},
year = {2025}
}