English

A-posteriori error estimates for the localized reduced basis multi-scale method

Numerical Analysis 2019-10-30 v3

Abstract

We present a localized a-posteriori error estimate for the localized reduced basis multi-scale (LRBMS) method [Albrecht, Haasdonk, Kaulmann, Ohlberger (2012): The localized reduced basis multiscale method]. The LRBMS is a combination of numerical multi-scale methods and model reduction using reduced basis methods to efficiently reduce the computational complexity of parametric multi-scale problems with respect to the multi-scale parameter ε\varepsilon and the online parameter μ\mu simultaneously. We formulate the LRBMS based on a generalization of the SWIPDG discretization presented in [Ern, Stephansen, Vohralik (2010): Guaranteed and robust discontinuous Galerkin a posteriori error estimates for convection-diffusion-reaction problems] on a coarse partition of the domain that allows for any suitable discretization on the fine triangulation inside each coarse grid element. The estimator is based on the idea of a conforming reconstruction of the discrete diffusive flux, that can be computed using local information only. It is offline/online decomposable and can thus be efficiently used in the context of model reduction.

Keywords

Cite

@article{arxiv.1401.7173,
  title  = {A-posteriori error estimates for the localized reduced basis multi-scale method},
  author = {Mario Ohlberger and Felix Schindler},
  journal= {arXiv preprint arXiv:1401.7173},
  year   = {2019}
}
R2 v1 2026-06-22T02:56:16.958Z