A stabilized finite element method for the Stokes-Temperature coupled problem
Abstract
In this work, we introduce and analyze a new stabilized finite element scheme for the Stokes-Temperature coupled problem. This new scheme allows equal order of interpolation to approximate the quantities of interest, i.e. velocity, pressure, temperature, and stress. We analyze an equivalent variational formulation of the coupled problem inspired by the ideas proposed in [3]. The existence of the discrete solution is proved, decoupling the proposed stabilized scheme and using the help of continuous dependence results and Brouwer's theorem under the standard assumption of sufficiently small data. Optimal convergence is proved under classic regularity assumptions of the solution. Finally, we present some numerical examples to show the quality of our scheme, in particular, we compare our results with those coming from a standard reference in geosciences described in [38]. (c) 2023 IMACS. Published by Elsevier B.V. All rights reserved.
Más información
Título según WOS: | A stabilized finite element method for the Stokes-Temperature coupled problem |
Título de la Revista: | APPLIED NUMERICAL MATHEMATICS |
Volumen: | 187 |
Editorial: | Elsevier |
Fecha de publicación: | 2023 |
Página de inicio: | 24 |
Página final: | 49 |
DOI: |
10.1016/j.apnum.2023.02.002 |
Notas: | ISI |