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Stability Analysis of Polytopic Discontinuous Galerkin Approximations of the Stokes Problem with Applications to Fluid–Structure Interaction Problems

Paola F. Antonietti, Lorenzo Mascotto, Marco Verani, Stefano Zonca

2022Virtual Community of Pathological Anatomy (University of Castilla La Mancha)17 citationsDOIOpen Access PDF

Abstract

We present a stability analysis of the Discontinuous Galerkin method on polygonal and polyhedral meshes (PolyDG) for the Stokes problem. In particular, we analyze the discrete inf-sup condition for different choices of the polynomial approximation order of the velocity and pressure approximation spaces. To this aim, we employ a generalized inf-sup condition with a pressure stabilization term. We also prove a priori hp-version error estimates in suitable norms. We numerically check the behaviour of the inf-sup constant and the order of convergence with respect to the mesh configuration, the mesh-size, and the polynomial degree. Finally, as a relevant application of our analysis, we consider the PolyDG approximation for a 2D fluid–structure interaction problem and we numerically explore the stability properties of the method.

Topics & Concepts

MathematicsDegree of a polynomialPolygon meshStability (learning theory)Convergence (economics)Galerkin methodPolynomialDiscontinuous Galerkin methodA priori and a posterioriStokes problemMathematical analysisApplied mathematicsRate of convergenceFinite element methodGeometryPhysicsComputer scienceThermodynamicsMachine learningEconomic growthEconomicsPhilosophyChannel (broadcasting)EpistemologyComputer networkAdvanced Numerical Methods in Computational MathematicsComputational Fluid Dynamics and AerodynamicsAdvanced Mathematical Modeling in Engineering
Stability Analysis of Polytopic Discontinuous Galerkin Approximations of the Stokes Problem with Applications to Fluid–Structure Interaction Problems | Litcius