The Spectral Difference Raviart–Thomas Method for Two and Three-Dimensional Elements and Its Connection with the Flux Reconstruction Formulation
Autor: | G. Sáez-Mischlich, J. Sierra-Ausín, J. Gressier |
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Přispěvatelé: | Centre National de la Recherche Scientifique - CNRS (FRANCE), Institut National Polytechnique de Toulouse - Toulouse INP (FRANCE), Institut Supérieur de l'Aéronautique et de l'Espace - ISAE-SUPAERO (FRANCE), Université Toulouse III - Paul Sabatier - UT3 (FRANCE) |
Jazyk: | angličtina |
Rok vydání: | 2022 |
Předmět: |
Numerical Analysis
Spectral element methods Applied Mathematics General Engineering Fluid Dynamics (physics.flu-dyn) Element types FOS: Physical sciences Numerical Analysis (math.NA) Physics - Fluid Dynamics 65M12 65M20 65M70 65T99 76F05 76F65 Theoretical Computer Science Spectral difference Computational Mathematics Von Neumann analysis High-order methods Computational Theory and Mathematics Autre Linear advection diffusion analysis Discontinuous Galerkin FOS: Mathematics Mathematics - Numerical Analysis Flux reconstruction Software |
Popis: | The purpose of this work is to describe in detail the development of the spectral difference Raviart–Thomas (SDRT) formulation for two and three-dimensional tensor-product elements and simplexes. Through the process, the authors establish the equivalence between the SDRT method and the flux reconstruction (FR) approach under the assumption of the linearity of the flux and the mesh uniformity. Such a connection allows building a new family of FR schemes for two and three-dimensional simplexes and also to recover the well-known FR-SD method with tensor-product elements. In addition, a thorough analysis of the numerical dissipation and dispersion of both aforementioned schemes and the nodal discontinuous Galerkin FR (FR-DG) method with two and three-dimensional elements is proposed through the use of the combined-mode Fourier approach. SDRT is shown to possess an enhanced temporal linear stability in comparison to FR-DG. On the contrary, SDRT displays larger dissipation and dispersion errors with respect to FR-DG. Finally, the study is concluded with a set of numerical experiments, the linear advection-diffusion problem, the Isentropic Euler Vortex, and the Taylor-Green Vortex (TGV). The latter test case shows that SDRT schemes present a non-linear unstable behavior with simplex elements and certain polynomial degrees. For the sake of completeness, the matrix form of the SDRT method is developed and the computational performance of SDRT with respect to FR schemes is evaluated using GPU architectures. |
Databáze: | OpenAIRE |
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