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We consider an inviscid stochastically forced dyadic model, where the additive noise acts only on the first component. We prove that a strong solution for this problem exists and is unique by means of uniform energy estimates. Moreover, we exploit these results to establish strong existence and uniqueness of the stationary distribution.

Strong existence and uniqueness of the stationary distribution for a stochastic inviscid dyadic model

Andreis L.;
2016-01-01

Abstract

We consider an inviscid stochastically forced dyadic model, where the additive noise acts only on the first component. We prove that a strong solution for this problem exists and is unique by means of uniform energy estimates. Moreover, we exploit these results to establish strong existence and uniqueness of the stationary distribution.
2016
NONLINEARITY
29
3
1156
1169
infinite dimensional system of SDEs; inviscid dyadic model; pathwise uniqueness; strong solution; strong statistically stationary solution
Andreis L.; Barbato D.; Collet F.; Formentin M.; Provenzano L.
03A-Articolo su Rivista
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2318/2133134
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