Arnaud Debussche, Étienne Mémin, Antoine Moneyron
Published 2024-07-02Version 1
In this paper, we consider a stochastic nonlinear formulation of classical coastal waves models under location uncertainty (LU). In the formal setting investigated here, stochastic versions of the Serre-Green- Nagdi, Boussinesq and classical shallow water wave models are obtained through an asymptotic expansion, which is similar to the one operated in the deterministic setting. However, modified advection terms emerge, together with advection noise terms. These terms are well-known features arising from the LU formalism, based on momentum conservation principle.
Moderate deviations for stochastic models of two-dimensional second grade fluids driven by L'evy noise
Stochastic models for a chemostat and long time behavior
Derivation of the Stochastic Burgers equation from the WASEP
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