Paper Info
Title
A Mixed Formulation for the Brinkman Problem.
Abstract
The Brinkman model is a unified law governing the flow of a viscous fluid in an inhomogeneous medium, where fractures, bubbles, or channels alternate inside a porous matrix. In this work, we explore a novel mixed formulation of the Brinkman problem based on the Hodge decomposition of the vector Laplacian. Introducing the flow's vorticity as an additional unknown, this formulation allows for a uniformly stable and conforming discretization by standard finite elements (Nedelec, Raviart-Thomas, piecewise discontinuous). A priori error estimates for the discretization error in the H(curl; Omega)-H(div; Omega)-L-2(Omega) norm of the solution, which are optimal with respect to the approximation properties of finite element spaces, are obtained. The theoretical results are illustrated with numerical experiments. Finally, the proposed formulation allows for a scalable block diagonal preconditioner which takes advantage of the auxiliary space algebraic multigrid solvers for H(curl) and H(div) problems available in the preconditioning library hypre (http://llnl.gov/CASC/hypre), as shown in a follow-up paper [P. S. Vassilevski and U. Villa, SIAM J. Sci. Comput., 35 (2013), pp. S3-S17].
Year
DOI
Venue
2014
10.1137/120884109
SIAM JOURNAL ON NUMERICAL ANALYSIS
Keywords
Field
DocType
Brinkman problem,Stokes-Darcy coupling,saddle point problems,block preconditioners,algebraic multigrid
Discretization,Mathematical optimization,Mathematical analysis,Matrix (mathematics),Finite element method,Vector Laplacian,Curl (mathematics),Multigrid method,Mathematics,Block matrix,Piecewise
Journal
Volume
Issue
ISSN
52
1
0036-1429
Citations 
PageRank 
References 
7
0.65
6
Authors
2
Name
Order
Citations
PageRank
Panayot S. Vassilevski110113.75
Umberto Villa2306.64