Solution Properties of a 3d Stochastic Euler Fluid Equation

@inproceedings{Crisan2017SolutionPO,
  title={Solution Properties of a 3d Stochastic Euler Fluid Equation},
  author={Dan Crisan and Franco Flandoli and Darryl D. Holm},
  year={2017}
}
We prove local well posedness in regular spaces and a Beale-Kato-Majda blow-up criterion for a recently derived stochastic model of the 3D Euler fluid equation for incompressible flow. This model describes incompressible fluid motions whose Lagrangian particle paths follow a stochastic process with cylindrical noise and also satisfy Newton’s 2nd Law in every Lagrangian domain.