Quadrature Points via Heat Kernel Repulsion
Numerical Analysis
2019-04-03 v2
Abstract
We discuss the classical problem of how to pick weighted points on a dimensional manifold so as to obtain a reasonable quadrature rule This problem, naturally, has a long history; the purpose of our paper is to propose selecting points and weights so as to minimize the energy functional is the geodesic distance and is the dimension of the manifold. This yields point sets that are theoretically guaranteed, via spectral theoretic properties of the Laplacian , to have good properties. One nice aspect is that the energy functional is universal and independent of the underlying manifold; we show several numerical examples.
Cite
@article{arxiv.1804.02327,
title = {Quadrature Points via Heat Kernel Repulsion},
author = {Jianfeng Lu and Matthias Sachs and Stefan Steinerberger},
journal= {arXiv preprint arXiv:1804.02327},
year = {2019}
}