Title of article
Polymorphic nodal elements and their application in discontinuous Galerkin methods
Author/Authors
Gassner، نويسنده , , Gregor J. and Lِrcher، نويسنده , , Frieder and Munz، نويسنده , , Claus-Dieter and Hesthaven، نويسنده , , Jan S.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
18
From page
1573
To page
1590
Abstract
In this work, we discuss two different but related aspects of the development of efficient discontinuous Galerkin methods on hybrid element grids for the computational modeling of gas dynamics in complex geometries or with adapted grids. In the first part, a recursive construction of different nodal sets for hp finite elements is presented. They share the property that the nodes along the sides of the two-dimensional elements and along the edges of the three-dimensional elements are the Legendre–Gauss–Lobatto points. The different nodal elements are evaluated by computing the Lebesgue constants of the corresponding Vandermonde matrix. In the second part, these nodal elements are applied within the modal discontinuous Galerkin framework. We still use a modal based formulation, but introduce a nodal based integration technique to reduce computational cost in the spirit of pseudospectral methods. We illustrate the performance of the scheme on several large scale applications and discuss its use in a recently developed space-time expansion discontinuous Galerkin scheme.
Keywords
Hexahedron , Pentahedron , discontinuous Galerkin , Nodal , modal , Polynomial interpolation , prism , hp Finite elements , Lebesgue constants , Quadrature free , Triangle , UNSTRUCTURED , Quadrilateral , polygonal , tetrahedron , pyramid
Journal title
Journal of Computational Physics
Serial Year
2009
Journal title
Journal of Computational Physics
Record number
1481247
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