An augmented stress-based mixed finite element method for the steady state Navier-Stokes equations with nonlinear viscosity
| Autor: | Ricardo Oyarzúa, Gabriel N. Gatica, Ricardo Ruiz-Baier, Jessika Camaño |
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| Rok vydání: | 2017 |
| Předmět: |
Numerical Analysis
Applied Mathematics Mathematical analysis Infinitesimal strain theory 010103 numerical & computational mathematics Mixed finite element method 01 natural sciences Finite element method 010101 applied mathematics Computational Mathematics symbols.namesake Nonlinear system Dirichlet boundary condition symbols Partial derivative Boundary value problem 0101 mathematics Navier–Stokes equations Analysis Mathematics |
| Zdroj: | Numerical Methods for Partial Differential Equations. 33:1692-1725 |
| ISSN: | 0749-159X |
| DOI: | 10.1002/num.22166 |
| Popis: | A new stress-based mixed variational formulation for the stationary Navier-Stokes equations with constant density and variable viscosity depending on the magnitude of the strain tensor, is proposed and analyzed in this work. Our approach is a natural extension of a technique applied in a recent paper by some of the authors to the same boundary value problem but with a viscosity that depends nonlinearly on the gradient of velocity instead of the strain tensor. In this case, and besides remarking that the strain-dependence for the viscosity yields a more physically relevant model, we notice that to handle this nonlinearity we now need to incorporate not only the strain itself but also the vorticity as auxiliary unknowns. Furthermore, similarly as in that previous work, and aiming to deal with a suitable space for the velocity, the variational formulation is augmented with Galerkin-type terms arising from the constitutive and equilibrium equations, the relations defining the two additional unknowns, and the Dirichlet boundary condition. In this way, and as the resulting augmented scheme can be rewritten as a fixed-point operator equation, the classical Schauder and Banach theorems together with monotone operators theory are applied to derive the well-posedness of the continuous and associated discrete schemes. In particular, we show that arbitrary finite element subspaces can be utilized for the latter, and then we derive optimal a priori error estimates along with the corresponding rates of convergence. Next, a reliable and efficient residual-based a posteriori error estimator on arbitrary polygonal and polyhedral regions is proposed. The main tools used include Raviart-Thomas and Clement interpolation operators, inverse and discrete inequalities, and the localization technique based on triangle-bubble and edge-bubble functions. Finally, several numerical essays illustrating the good performance of the method, confirming the reliability and efficiency of the a posteriori error estimator, and showing the desired behavior of the adaptive algorithm, are reported. © 2017 Wiley Periodicals, Inc. Numer Methods Partial Differential Eq 33: 1692–1725, 2017 |
| Databáze: | OpenAIRE |
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