Upper spectral bounds and a posteriori error analysis of several mixed finite element approximations for the Stokes eigenvalue problem
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Publication:365860
DOI10.1007/s11425-013-4582-4zbMath1273.65171OpenAlexW1585613868MaRDI QIDQ365860
Mohammad Hasan, M. Dambrine, H. S. Yoon
Publication date: 9 September 2013
Published in: Science China. Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11425-013-4582-4
a posteriori error estimatesconforming mixed finite elementsStokes eigenvalue problemupper spectral bounds
Finite element, Rayleigh-Ritz and Galerkin methods for boundary value problems involving PDEs (65N30) Numerical methods for eigenvalue problems for boundary value problems involving PDEs (65N25)
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Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- The correction operator for the canonical interpolation operator of the Adini element and the lower bounds of eigenvalues
- Eigenvalue approximations from below using Morley elements
- A defect-correction method for unsteady conduction-convection problems. I: Spatial discretization
- High order compact schemes for gradient approximation
- The order-preserving convergence for spectral approximation of self-adjoint completely continuous operators
- A posteriori error analysis of nonconforming methods for the eigenvalue problem
- Lower spectral bounds by Wilson's brick discretization
- New expansions of numerical eigenvalues by Wilson's element
- Asymptotic error expansion and Richardson extrapolation of eigenvalue approximations for second order elliptic problems by the mixed finite element method
- A stable finite element for the Stokes equations
- A posteriori error estimators for the Stokes equations
- A regularity result for the Stokes problem in a convex polygon
- Asymptotic lower bounds for eigenvalues by nonconforming finite element methods
- A numerical existence proof of nodal lines for the first eigenfunction of the plate equation
- Computing the lower and upper bounds of Laplace eigenvalue problem by combining conforming and nonconforming finite element methods
- Eigenvalue approximation from below using non-conforming finite elements
- Asymptotic expansions and extrapolations of eigenvalues for the Stokes problem by mixed finite element methods
- Adaptive finite element algorithms for eigenvalue problems based on local averaging type a posteriori error estimates
- A Posteriori Error Estimates for the Finite Element Approximation of Eigenvalue Problems
- New expansions of numerical eigenvalues for $-\Delta u=\lambda \rho u$ by nonconforming elements
- Two-Grid Finite Element Discretization Schemes Based on Shifted-Inverse Power Method for Elliptic Eigenvalue Problems
- Error estimates for a mixed finite element approximation of the Stokes equations
- Analysis of Mixed Finite Element Methods for the Stokes Problem: A Unified Approach
- An optimal control approach to a posteriori error estimation in finite element methods
- Analysis of Some Finite Elements for the Stokes Problem
- Finite Element Methods for Navier-Stokes Equations
- Eigenvalue Approximation by Mixed and Hybrid Methods
- Mixed and Hybrid Finite Element Methods
- A‐posteriori error estimates for the finite element method
- Global Superconvergence for the Bilinear-Constant Scheme for the Stokes Problem
- A Posteriori and a Priori Error Analysis for Finite Element Approximations of Self-Adjoint Elliptic Eigenvalue Problems
- A POSTERIORI ERROR ESTIMATORS FOR MIXED APPROXIMATIONS OF EIGENVALUE PROBLEMS
- 特征值问题协调/非协调有限元后验误差分析
- Enhancing Eigenvalue Approximation by Gradient Recovery
- A posteriori estimates for the Stokes eigenvalue problem
- A posteriori error control for finite element approximations of elliptic eigenvalue problems
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