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Two-level stabilized method based on Newton iteration for the steady Smagorinsky model - MaRDI portal

Two-level stabilized method based on Newton iteration for the steady Smagorinsky model

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Publication:1940182

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DOI10.1016/j.nonrwa.2012.11.011zbMath1261.35122OpenAlexW1968545639MaRDI QIDQ1940182

Xinlong Feng, Demin Liu, Pengzhan Huang

Publication date: 6 March 2013

Published in: Nonlinear Analysis. Real World Applications (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1016/j.nonrwa.2012.11.011

zbMATH Keywords

Newton iteration Smagorinsky model two-level strategy local Gauss integration lowest equal-order pair

Mathematics Subject Classification ID

PDEs in connection with fluid mechanics (35Q35) Stability in context of PDEs (35B35) Theoretical approximation in context of PDEs (35A35)

Related Items (16)

An efficient two-level finite element algorithm for the natural convection equations ⋮ A three-step stabilized algorithm for the Navier-Stokes type variational inequality ⋮ A three‐step Oseen‐linearized finite element method for incompressible flows with damping ⋮ A parallel finite element method based on fully overlapping domain decomposition for the steady-state Smagorinsky model ⋮ A new two-grid algorithm based on Newton iteration for the stationary Navier-Stokes equations with damping ⋮ Two‐step discretization method for <scp>2D</scp>/<scp>3D Allen–Cahn</scp> equation based on <scp>RBF‐FD</scp> scheme ⋮ Error estimates of a two‐grid penalty finite element method for the Smagorinsky model ⋮ A three-step defect-correction stabilized algorithm for incompressible flows with non-homogeneous Dirichlet boundary conditions ⋮ Numerical study of Fisher's equation by the RBF-FD method ⋮ Error estimates of two-level finite element method for Smagorinsky model ⋮ Three Iterative Finite Element Methods for the Stationary Smagorinsky Model ⋮ A nonconforming finite element method for the stationary Smagorinsky model ⋮ Unnamed Item ⋮ Several iterative schemes for the stationary natural convection equations at different <scp>R</scp>ayleigh numbers ⋮ A three-step defect-correction algorithm for incompressible flows with friction boundary conditions ⋮ A two-step stabilized finite element algorithm for the Smagorinsky model

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