English

Finite element approximation of the Einstein tensor

Numerical Analysis 2023-11-27 v2 Numerical Analysis Differential Geometry

Abstract

We construct and analyze finite element approximations of the Einstein tensor in dimension N3N \ge 3. We focus on the setting where a smooth Riemannian metric tensor gg on a polyhedral domain ΩRN\Omega \subset \mathbb{R}^N has been approximated by a piecewise polynomial metric ghg_h on a simplicial triangulation T\mathcal{T} of Ω\Omega having maximum element diameter hh. We assume that ghg_h possesses single-valued tangential-tangential components on every codimension-1 simplex in T\mathcal{T}. Such a metric is not classically differentiable in general, but it turns out that one can still attribute meaning to its Einstein curvature in a distributional sense. We study the convergence of the distributional Einstein curvature of ghg_h to the Einstein curvature of gg under refinement of the triangulation. We show that in the H2(Ω)H^{-2}(\Omega)-norm, this convergence takes place at a rate of O(hr+1)O(h^{r+1}) when ghg_h is an optimal-order interpolant of gg that is piecewise polynomial of degree r1r \ge 1. We provide numerical evidence to support this claim.

Keywords

Cite

@article{arxiv.2310.18802,
  title  = {Finite element approximation of the Einstein tensor},
  author = {Evan S. Gawlik and Michael Neunteufel},
  journal= {arXiv preprint arXiv:2310.18802},
  year   = {2023}
}

Comments

arXiv admin note: text overlap with arXiv:2301.02159

R2 v1 2026-06-28T13:04:47.232Z