http://www.ann.jussieu.fr/frey/papers/Navier-Stokes/Ghia%20V.,%20High-Resolutions%20for%20incompressible%20flow%20using%20the%20Navier-Stokes%20equations%20and%20a%20multi-grid%20method.pdf

High-Re solutions for incompressible flow using the Navier-Stokes equations and a multigrid method

Application of a Fractional-Step Method to Incompressible Navier-Stokes Equations

This review pertains to the body of work dealing with internal recirculating flows generated by the motion of one or more of the containing walls. These flows are not only technologically important, they are of great scientific interest because they display almost all fluid mechanical phenomena in the simplest of geometrical settings. Thus corner eddies, longitudinal vortices, nonuniqueness, transition, and turbulence all occur naturally and can be studied in the same closed geometry. This facilitates the comparison of results from experiment, analysis, and computation over the whole range of Reynolds numbers. Considerable progress has been made in recent years in the understanding of three-dimensional flows and in the study of turbulence. The use of direct numerical simulation appears very promising.

/pdf/fluid-mechanics-in-the-driven-cavity-25evptx577.pdf

Fluid mechanics in the driven cavity

Block-implicit multigrid solution of Navier-Stokes equations in primitive variables

SUMMARY Numerical calculations of the 2-D steady incompressible driven cavity flow are presented. The NavierStokes equations in streamfunction and vorticity formulation are solved numerically using a fine uniform grid mesh of 601 × 601. The steady driven cavity solutions are computed for Re ≤ 21,000 with a maximum absolute residuals of the governing equations that were less than 10 −10 . A new quaternary vortex at the bottom left corner and a new tertiary vortex at the top left corner of the cavity are observed in the flow field as the Reynolds number increases. Detailed results are presented and comparisons are made with benchmark solutions found in the literature.

pdf/numerical-solutions-of-2-d-steady-incompressible-driven-2968kr2pzh.pdf

Numerical solutions of 2‐D steady incompressible driven cavity flow at high Reynolds numbers

On the convergence of numerical solutions for 2-D flows in a cavity at large Re

A new method for solving two-point boundary value problems using optimal node distribution

Comparisons of Galerkin and finite difference methods for solving highly nonlinear thermally driven flows

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Papers

On the convergence of numerical solutions for 2-D flows in a cavity at large Re

A new method for solving two-point boundary value problems using optimal node distribution

Comparisons of Galerkin and finite difference methods for solving highly nonlinear thermally driven flows