We propose a discontinuous Galerkin method for the Poisson equation on polygonal tessel- lations in two dimensions, stabilized by penalizing, locally in each element K, a residual term involving the fluxes, measured in the norm of the dual of H1(K). The scalar product corresponding to such a norm is numerically realized via the introduction of a (minimal) auxiliary space inspired by the Virtual Element Method. Stability and optimal error estimates in the broken H1 norm are proven under a weak shape regularity assumption allowing the presence of very small edges. The results of numerical tests confirm the theoretical estimates.
A polygonal discontinuous Galerkin method with minus one stabilisation
S Bertoluzza;D Prada
2021
Abstract
We propose a discontinuous Galerkin method for the Poisson equation on polygonal tessel- lations in two dimensions, stabilized by penalizing, locally in each element K, a residual term involving the fluxes, measured in the norm of the dual of H1(K). The scalar product corresponding to such a norm is numerically realized via the introduction of a (minimal) auxiliary space inspired by the Virtual Element Method. Stability and optimal error estimates in the broken H1 norm are proven under a weak shape regularity assumption allowing the presence of very small edges. The results of numerical tests confirm the theoretical estimates.| File | Dimensione | Formato | |
|---|---|---|---|
|
prod_446502-doc_177472.pdf
accesso aperto
Descrizione: A polygonal discontinuous Galerkin method with minus one stabilisation
Tipologia:
Versione Editoriale (PDF)
Licenza:
Creative commons
Dimensione
582.27 kB
Formato
Adobe PDF
|
582.27 kB | Adobe PDF | Visualizza/Apri |
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
