| 11. | Which is an exact solution of the two-dimensional Navier-- Stokes equations.
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| 12. | They do not depend on the elasticity or the Navier-Stokes equations.
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| 13. | Then the incompressible Navier� Stokes equations are best visualised by dividing for the density:
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| 14. | Each term in any case of the Navier� Stokes equations is a body force.
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| 15. | Then, the Navier-Stokes equations, together with the rheological model, reduce to a single equation:
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| 16. | Leonhard Euler would go on to publish the Navier-Stokes equations.
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| 17. | The Navier� Stokes equations were the ultimate target of development.
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| 18. | Then the Navier� Stokes equations, without additional forcing, reduce to:
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| 19. | The Navier� Stokes equations applied to atmospheric motion can be simplified by geostrophic approximation.
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| 20. | As a result, analytical solutions for the Navier-Stokes equations still remain a tough research topic.
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