A Precise Computation of Drag Coefficients of a Sphere
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Publication:4220018
DOI10.1080/10618569808940861zbMath0917.76040OpenAlexW2007711244MaRDI QIDQ4220018
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Publication date: 11 November 1998
Published in: International Journal of Computational Fluid Dynamics (Search for Journal in Brave)
Full work available at URL: http://hdl.handle.net/2433/60760
Navier-Stokes equations for incompressible viscous fluids (76D05) Finite element methods applied to problems in fluid mechanics (76M10)
Related Items (10)
Practical shape optimization of a levitation device for single droplets ⋮ On aerodynamic force computation in fluid-structure interaction problems -- comparison of different approaches ⋮ A Lagrangian free-stream boundary condition for weakly compressible smoothed particle hydrodynamics ⋮ Non-oscillatory forward-in-time integrators for viscous incompressible flows past a sphere ⋮ A comparative study on evaluation methods of fluid forces on Cartesian grids ⋮ Error estimates for finite element approximations of drag and lift in nonstationary Navier-Stokes flows ⋮ Assessment of a high-order discontinuous Galerkin method for incompressible three-dimensional Navier-Stokes equations: benchmark results for the flow past a sphere up to Re=500 ⋮ Extending the functionality of the general-purpose finite element package SEPRAN by automatic differentiation ⋮ Vorticity transport on a Lagrangian tetrahedral mesh ⋮ Active control and drag optimization for flow past a circular cylinder. I: Oscillatory cylinder rotation
Cites Work
- A mixed finite element method for boundary flux computation
- Finite-element analysis of high Reynolds number flows past a circular cylinder
- Incompressible flow computations with stabilized bilinear and linear equal-order-interpolation velocity-pressure elements
- Stabilized finite element methods. I.: Application to the advective- diffusive model
- Stabilized finite element methods. II: The incompressible Navier-Stokes equations
- The consistent Galerkin FEM for computing derived boundary quantities in thermal and or fluids problems
- Flow past a sphere - Topological transitions of the vorticity field
- A modified finite element method for solving the time‐dependent, incompressible Navier‐Stokes equations. Part 2: Applications
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