English

Polyharmonic homogenization, rough polyharmonic splines and sparse super-localization

Numerical Analysis 2019-02-20 v2 Analysis of PDEs

Abstract

We introduce a new variational method for the numerical homogenization of divergence form elliptic, parabolic and hyperbolic equations with arbitrary rough (LL^\infty) coefficients. Our method does not rely on concepts of ergodicity or scale-separation but on compactness properties of the solution space and a new variational approach to homogenization. The approximation space is generated by an interpolation basis (over scattered points forming a mesh of resolution HH) minimizing the L2L^2 norm of the source terms; its (pre-)computation involves minimizing O(Hd)\mathcal{O}(H^{-d}) quadratic (cell) problems on (super-)localized sub-domains of size O(Hln(1/H))\mathcal{O}(H \ln (1/ H)). The resulting localized linear systems remain sparse and banded. The resulting interpolation basis functions are biharmonic for d3d\leq 3, and polyharmonic for d4d\geq 4, for the operator \diiv(a)-\diiv(a\nabla \cdot) and can be seen as a generalization of polyharmonic splines to differential operators with arbitrary rough coefficients. The accuracy of the method (O(H)\mathcal{O}(H) in energy norm and independent from aspect ratios of the mesh formed by the scattered points) is established via the introduction of a new class of higher-order Poincar\'{e} inequalities. The method bypasses (pre-)computations on the full domain and naturally generalizes to time dependent problems, it also provides a natural solution to the inverse problem of recovering the solution of a divergence form elliptic equation from a finite number of point measurements.

Keywords

Cite

@article{arxiv.1212.0812,
  title  = {Polyharmonic homogenization, rough polyharmonic splines and sparse super-localization},
  author = {Houman Owhadi and Lei Zhang and Leonid Berlyand},
  journal= {arXiv preprint arXiv:1212.0812},
  year   = {2019}
}

Comments

ESAIM: Mathematical Modelling and Numerical Analysis. Special issue (2013)

R2 v1 2026-06-21T22:48:40.909Z