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A post-processed higher-order multiscale method for nondivergence-form elliptic equations

Numerical Analysis 2026-04-17 v1 Numerical Analysis

Abstract

We study the finite element approximation of linear second-order elliptic partial differential equations in nondivergence form with highly heterogeneous diffusion and drift coefficients. A generalized Cordes condition is imposed to guarantee that a suitably renormalized version of the nondivergence-form differential operator is near the Laplacian. Based on a stabilized symmetric formulation for the gradient that enables the use of H1H^1-conforming approximation spaces, we construct a multiscale method following the methodology of the localized orthogonal decomposition with coarse basis functions tailored to the heterogeneous coefficients. We employ a novel post-processing strategy to obtain higher-order convergence rates, overcoming previous limitations imposed by the low regularity of the load functional. Numerical experiments demonstrate the performance of the method.

Keywords

Cite

@article{arxiv.2604.15144,
  title  = {A post-processed higher-order multiscale method for nondivergence-form elliptic equations},
  author = {Moritz Hauck and Roland Maier and Timo Sprekeler},
  journal= {arXiv preprint arXiv:2604.15144},
  year   = {2026}
}

Comments

23 pages

R2 v1 2026-07-01T12:12:52.850Z