A posteriori error analysis of a semi-augmented finite element method for double-diffusive natural convection in porous media

 

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Autores: Álvarez Guadamuz, Mario Andrés, Colmenares García, Eligio Antonio, Sequeira Chavarría, Filander A.
Formato: artículo original
Fecha de Publicación:2024
Descripción:This paper presents our contribution to the a posteriori error analysis in 2D and 3D of a semi-augmented mixed-primal finite element method previously developed by us to numerically solve double-diffusive natural convection problem in porous media. The model combines Brinkman-Navier-Stokes equations for velocity and pressure coupled to a vector advection-diffusion equation, representing heat and concentration of a certain substance in a viscous fluid within a porous medium. Strain and pseudo-stress tensors were introduced to establish scheme solvability and provide a priori error estimates using Raviart-Thomas elements, piecewise polynomials and Lagrange finite elements. In this work, we derive two reliable residual-based a posteriori error estimators. The first estimator leverages ellipticity properties, Helmholtz decomposition as well as Clément interpolant and Raviart-Thomas operator properties for showing reliability; efficiency is guaranteed by inverse inequalities and localization strategies. An alternative estimator is also derived and analyzed for reliability without Helmholtz decomposition. Numerical tests are presented to confirm estimator properties and demonstrate adaptive scheme performance.
País:Kérwá
Institución:Universidad de Costa Rica
Repositorio:Kérwá
Lenguaje:Inglés
OAI Identifier:oai:kerwa.ucr.ac.cr:10669/91161
Acceso en línea:https://onlinelibrary.wiley.com/doi/10.1002/num.23090
https://hdl.handle.net/10669/91161
Palabra clave:MATHEMATICS
EQUATIONS