A new discrete exterior calculus scheme for incompressible fluid equations preserves geometric structure and energy, yielding convergence results across smooth, weak, measure-valued, and dissipative regimes on specific meshes.
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Exact conservation as selection principle: discrete exterior calculus for the incompressible Navier-Stokes and Euler equations
A new discrete exterior calculus scheme for incompressible fluid equations preserves geometric structure and energy, yielding convergence results across smooth, weak, measure-valued, and dissipative regimes on specific meshes.