A geometric construction based on a generalized Coriolis force yields explicit global non-stationary solutions to the Euler equations on selected 2D and 3D manifolds, with full classification in 2D and partial in 3D.
Tao,On the universality of the incompressible Euler equation on compact manifolds, Discrete Contin
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Exact non-stationary solutions of the Euler equations in two and three dimensions
A geometric construction based on a generalized Coriolis force yields explicit global non-stationary solutions to the Euler equations on selected 2D and 3D manifolds, with full classification in 2D and partial in 3D.