The 2D Euler equations with random initial condition distributed as a certain Gaussian measure are considered. The theory developed by S. Albeverio and A.-B. Cruzeiro is revisited, following the approach of weak vorticity formulation. A solution is constructed as a limit of random point vortices. This allows to prove that it is also limit of L ∞ -vorticity solutions. The result is generalized to initial measures that have a continuous bounded density with respect to the original Gaussian measure.

Weak vorticity formulation of 2D Euler equations with white noise initial condition

Flandoli F.
2018

Abstract

The 2D Euler equations with random initial condition distributed as a certain Gaussian measure are considered. The theory developed by S. Albeverio and A.-B. Cruzeiro is revisited, following the approach of weak vorticity formulation. A solution is constructed as a limit of random point vortices. This allows to prove that it is also limit of L ∞ -vorticity solutions. The result is generalized to initial measures that have a continuous bounded density with respect to the original Gaussian measure.
2018
Settore MAT/06 - Probabilita' e Statistica Matematica
2D Euler equations; point voritices; random initial conditions; white noise
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11384/82024
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