International audienceWe present a derivation of a stochastic model of Navier Stokes equations that relies on a decomposition of the velocity fields into a differentiable drift component and a time uncorrelated uncertainty random term. This type of decomposition is reminiscent in spirit to the classical Reynolds decomposition. However, the random velocity fluctuations considered here are not differentiable with respect to time, and they must be handled through stochastic calculus. The dynamics associated with the differentiable drift component is derived from a stochastic version of the Reynolds transport theorem. It includes in its general form an uncertainty dependent subgrid bulk formula that cannot be immediately related to the usual Bo...
International audienceModels under location uncertainty are derived assuming that a component of the...
We provide a new framework for the study of fluid flows presenting complex uncertain behaviour. Our ...
International audienceThe models under location uncertainty recently introduced by Mémin [16] provid...
International audienceA stochastic flow representation is considered with the Eulerian velocity deco...
International audienceIn this talk we will describe a framework for the systematic derivation of sto...
In this paper we analyze the theoretical properties of a stochastic representation of the incompress...
International audienceWe explore the potential of a formulation of the Navier-Stokes equations incor...
International audienceWe propose a representation that allows decomposing the flow velocity in terms...
International audienceUsing a classical example, the Lorenz-63 model, an original stochastic framewo...
International audienceNumerical simulations of industrial and geophysical fluid flows cannot usually...
This thesis develops, analyzes and demonstrates several valuable applications of randomized fluid dy...
International audienceStochastic models can be developed to perform ensemble forecasts of geophysica...
International audienceEnsemble forecasting and filtering are widely used in geophysical sciences for...
International audienceModels under location uncertainty are derived assuming that a component of the...
International audienceModels under location uncertainty are derived assuming that a component of the...
We provide a new framework for the study of fluid flows presenting complex uncertain behaviour. Our ...
International audienceThe models under location uncertainty recently introduced by Mémin [16] provid...
International audienceA stochastic flow representation is considered with the Eulerian velocity deco...
International audienceIn this talk we will describe a framework for the systematic derivation of sto...
In this paper we analyze the theoretical properties of a stochastic representation of the incompress...
International audienceWe explore the potential of a formulation of the Navier-Stokes equations incor...
International audienceWe propose a representation that allows decomposing the flow velocity in terms...
International audienceUsing a classical example, the Lorenz-63 model, an original stochastic framewo...
International audienceNumerical simulations of industrial and geophysical fluid flows cannot usually...
This thesis develops, analyzes and demonstrates several valuable applications of randomized fluid dy...
International audienceStochastic models can be developed to perform ensemble forecasts of geophysica...
International audienceEnsemble forecasting and filtering are widely used in geophysical sciences for...
International audienceModels under location uncertainty are derived assuming that a component of the...
International audienceModels under location uncertainty are derived assuming that a component of the...
We provide a new framework for the study of fluid flows presenting complex uncertain behaviour. Our ...
International audienceThe models under location uncertainty recently introduced by Mémin [16] provid...