English

Quadrature Points via Heat Kernel Repulsion

Numerical Analysis 2019-04-03 v2

Abstract

We discuss the classical problem of how to pick NN weighted points on a dd-dimensional manifold so as to obtain a reasonable quadrature rule 1MMf(x)dx1Nn=1Naif(xi). \frac{1}{|M|}\int_{M}{f(x) dx} \simeq \frac{1}{N} \sum_{n=1}^{N}{a_i f(x_i)}. 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 i,j=1Naiajexp(d(xi,xj)24t)min,\mboxwhere tN2/d, \sum_{i,j =1}^{N}{ a_i a_j \exp\left(-\frac{d(x_i,x_j)^2}{4t}\right) } \rightarrow \min, \quad \mbox{where}~t \sim N^{-2/d}, d(x,y)d(x,y) is the geodesic distance and dd is the dimension of the manifold. This yields point sets that are theoretically guaranteed, via spectral theoretic properties of the Laplacian Δ-\Delta, 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}
}
R2 v1 2026-06-23T01:16:15.830Z