Abstract
AbstractWe consider inverse parametric problems for elliptic variational PDEs. They are solved through the minimization of misfit functionals. Main difficulties encountered consist in the misfit multimodality and insensitivity as well as in the weak conditioning of the direct (forward) problem, that therefore requires stabilization. A complex multi-population memetic strategy hp-HMS combined with the Petrov-Galerkin method stabilized by the Demkowicz operator is proposed to overcome obstacles mentioned above. This paper delivers the theoretical motivation for the common inverse/forward error scaling, that can reduce significantly the computational cost of the whole strategy. A short illustrative numerical example is attached at the end of the paper.
Publisher
Springer International Publishing
Reference16 articles.
1. Babuška, I.: Error-bounds for finite element method. Numerische Mathematic 16, 322–333 (1971)
2. Barabasz, B., Gajda-Zagórska, E., Migórski, S., Paszyński, M., Schaefer, R., Smołka, M.: A hybrid algorithm for solving inverse problems in elasticity. Int. J. Appl. Math. Comput. Sci. 24(4), 865–886 (2014)
3. Barabasz, B., Migórski, S., Schaefer, R., Paszyński, M.: Multi-deme, twin adaptive strategy hp-HGS. Inverse Probl. Sci. Eng. 19(1), 3–16 (2011)
4. Beilina, L., Klibanov, M.V.: Approximate Global Convergence and Adaptivity for Coefficient Inverse Problems. Springer, Boston (2012). https://doi.org/10.1007/978-1-4419-7805-9
5. Bramwell, J.: A Discontinuous Petrov-Galerkin Method for Seismic Tomography Problems. Ph.D. thesis, The University of Texas at Austin, Austin, USA (2013)
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