Pages that link to "Item:Q2361925"
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The following pages link to Numerical validation of the volume penalization method in three-dimensional pseudo-spectral simulations (Q2361925):
Displaying 16 items.
- A characteristic based volume penalization method for general evolution problems applied to compressible viscous flows (Q348874) (← links)
- A volume penalization method for incompressible flows and scalar advection-diffusion with moving obstacles (Q441929) (← links)
- Approximation of the Laplace and Stokes operators with Dirichlet boundary conditions through volume penalization: a spectral viewpoint (Q466051) (← links)
- An efficient iterative penalization method using recycled Krylov subspaces and its application to impulsively started flows (Q683423) (← links)
- Simulation of confined magnetohydrodynamic flows with Dirichlet boundary conditions using a pseudo-spectral method with volume penalization (Q728648) (← links)
- A Fourier spectral method for the Navier-Stokes equations with volume penalization for moving solid obstacles (Q834114) (← links)
- A 3D pseudospectral algorithm for fluid flows with permeable walls. Application to filtration (Q1641280) (← links)
- Direct numerical simulation of aeroacoustic sound by volume penalization method (Q1646883) (← links)
- Comparison of a spectral method with volume penalization and a finite volume method with body fitted grids for turbulent flows (Q1646967) (← links)
- Direct numerical simulations of three-dimensional flows past obstacles with a vortex penalization method (Q1647037) (← links)
- Iterative Brinkman penalization for simulation of impulsively started flow past a sphere and a circular disc (Q1685603) (← links)
- Experimental validation of volume-based comparison for double-McCormick relaxations (Q2011595) (← links)
- Pressure-tight and non-stiff volume penalization for compressible flows. An immersed boundary method with good conservation properties (Q2077470) (← links)
- Numerical simulation of the transient flow behaviour in chemical reactors using a penalisation method (Q2498642) (← links)
- Analysis of Obstacles Immersed in Viscous Fluids Using Brinkman's Law for Steady Stokes and Navier--Stokes Equations (Q5094409) (← links)
- The turbulent Faraday instability in miscible fluids (Q5207579) (← links)