Quasi-optimality of nonconforming methods for linear variational problems
Speaker:
Pietro Zanotti
Affiliation:
Universita' degli Studi di Milano
When:
Thursday 16th March 2017
Time:
11:00:00
Where:
Aula Seminari "Saleri" VI Piano MOX-Dipartimento di Matematica, Edificio 14 POLITECNICO DI MILANO
Abstract:
We consider the approximation of linear elliptic variational problems, symmetric for simplicity. According to the Cea’s lemma, conforming Galerkin methods for these problems are quasi-optimal. Conversely, a simple argument reveals that classical nonconforming methods do not enjoy such property. Motivated by this observation, we derive necessary and sufficient conditions for quasi-optimality, within a large class of methods. Moreover, we identify the quasi-optimality constant and discuss its ingredients. In the second part of the talk, we present a detailed construction of two quasi-optimal nonconforming methods for a model problem and show that the corresponding quasi-optimality constants are bounded in terms of the shape parameter of the underlying meshes. This is a joint work with Andreas Veeser.
contact:
paola.antonietti@polimi.it
simona.perotto@polimi.it
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