HIGH ACCURACY METHOD FOR TURBULENT FLOW PROBLEMS
From MaRDI portal
Publication:2911911
DOI10.1142/S0218202512500054zbMath1437.76039MaRDI QIDQ2911911
No author found.
Publication date: 3 September 2012
Published in: Mathematical Models and Methods in Applied Sciences (Search for Journal in Brave)
Finite difference methods applied to problems in fluid mechanics (76M20) Spectral methods applied to problems in fluid mechanics (76M22) Stability and convergence of numerical methods for initial value and initial-boundary value problems involving PDEs (65M12) Turbulence (76F99)
Related Items (16)
Fluid-Fluid Interaction Problems at High Reynolds Numbers: Reducing the Modeling Error with LES-C ⋮ Improving regularization techniques for incompressible fluid flows via defect correction ⋮ Approximate deconvolution models for a fluid-fluid interaction problem with high Reynolds numbers ⋮ A Defect-Deferred Correction Method for Fluid-Fluid Interaction ⋮ On free surface PDE constrained shape optimization problems ⋮ Magnetohydrodynamic flows: Boussinesq conjecture ⋮ Validation of LES-C turbulence models ⋮ Approximate deconvolution with correction -- a high fidelity model for magnetohydrodynamic flows at high Reynolds and magnetic Reynolds numbers ⋮ Approximate Deconvolution with Correction: A Member of a New Class of Models for High Reynolds Number Flows ⋮ A second-order decoupled algorithm with different subdomain time steps for the non-stationary Stokes/Darcy model ⋮ Defect-deferred correction method for the two-domain convection-dominated convection-diffusion problem ⋮ A defect correction approach to turbulence modeling ⋮ Higher temporal accuracy for LES-C turbulence models ⋮ Two approaches to creating a turbulence model with increased temporal accuracy ⋮ Unconditional stability of a partitioned IMEX method for magnetohydrodynamic flows ⋮ A high accuracy minimally invasive regularization technique for navier–stokes equations at high reynolds number
Cites Work
- Finite element approximation of the Navier-Stokes equations
- Large eddy simulation for turbulent magnetohydrodynamic flows
- The stabilized extrapolated trapezoidal finite element method for the Navier-Stokes equations
- Finite element error analysis of a zeroth order approximate deconvolution model based on a mixed formulation
- High-order multi-implicit spectral deferred correction methods for problems of reactive flow.
- Large eddy simulation of turbulent incompressible flows. Analytical and numerical results for a class of LES models.
- Semi-implicit projection methods for incompressible flow based on spectral deferred corrections.
- Spectral deferred correction methods for ordinary differential equations
- A defect-correction method for the incompressible Navier-Stokes equations.
- Tensor-Krylov methods for large nonlinear equations
- Approximate deconvolution boundary conditions for large eddy simulation
- A fourth-order auxiliary variable projection method for zero-Mach number gas dynamics
- Semi-implicit spectral deferred correction methods for ordinary differential equations
- Approximate Deconvolution Models for Magnetohydrodynamics
- Iterative Defect Correction and Multigrid Accelerated Explicit Time Stepping Schemes for the Steady Euler Equations
- Defect correction method for viscoelastic fluid flows at high Weissenberg number
- Finite-Element Approximation of the Nonstationary Navier–Stokes Problem. Part IV: Error Analysis for Second-Order Time Discretization
- Equilibrium and travelling-wave solutions of plane Couette flow
- An Analysis of a Defect-Correction Method for a Model Convection-Diffusion Equation
- Adaptive Defect-Correction Methods for Viscous Incompressible Flow Problems
- Defect Correction for Convection-Dominated Flow
- On the Stolz--Adams Deconvolution Model for the Large-Eddy Simulation of Turbulent Flows
This page was built for publication: HIGH ACCURACY METHOD FOR TURBULENT FLOW PROBLEMS
