ROBUST MULTIGRID TECHNIQUES FOR AUGMENTED LAGRANGIAN PRECONDITIONING OF INCOMPRESSIBLE STOKES EQUATIONS WITH EXTREME VISCOSITY VARIATIONS

Yu Hsuan Shih, Georg Stadler, Florian Wechsung

Research output: Contribution to journalArticlepeer-review

Abstract

We present augmented Lagrangian Schur complement preconditioners and robust multigrid methods for incompressible Stokes problems with extreme viscosity variations. Such Stokes systems arise, for instance, upon linearization of nonlinear viscous flow problems, and they can have severely inhomogeneous and anisotropic coefficients. Using an augmented Lagrangian formulation for the incompressibility constraint makes the Schur complement easier to approximate but results in a nearly singular (1,1)-block in the Stokes system. We present eigenvalue estimates for the quality of the Schur complement approximation. To cope with the near-singularity of the (1,1)-block, we extend a multigrid scheme with a discretization-dependent smoother and transfer operators from triangular/tetrahedral to the quadrilateral/hexahedral finite element discretizations [ℚk]d × ℙdisck-1, k ≥ 2, d = 2, 3. Using numerical examples with scalar and with anisotropic fourth-order tensor viscosity arising from linearization of a viscoplastic constitutive relation, we confirm the robustness of the multigrid scheme and the overall efficiency of the solver. We present scalability results using up to 28,672 parallel tasks for problems with up to 1.6 billion unknowns and a viscosity contrast up to ten orders of magnitude.

Original languageEnglish (US)
Pages (from-to)S27-S53
JournalSIAM Journal on Scientific Computing
Volume45
Issue number3
DOIs
StatePublished - 2023

Keywords

  • augmented Lagrangian method
  • incompressible Stokes
  • parameter-robust multigrid
  • preconditioning
  • variable viscosity

ASJC Scopus subject areas

  • Computational Mathematics
  • Applied Mathematics

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