Computation of 2D Navier–Stokes equations with moving interfaces by using GMRES

We study the local exponential stabilizability with internally distributed feedback controllers for the incompressible 2D-Navier-Stokes equations with Navier slip boundary conditions. These controllers are localized in a subdomain and take values in a finite-dimensional space.

A new approach to the constrained design of aerodynamic shapes is suggested. The approach employs Genetic Algorithms (GAs) as an optimization tool in combination with a Reduced-Order Models (ROM) method based on linked local data bases obtained by full Navier-Stokes computations. The important featu

## Abstract We prove that the Kolmogorov operator associated with stochastic Navier‐Stokes‐Coriolis equations on the 2D‐Torus is __m__‐dissipative in the space __L^p^__(μ) for any __p__ ∈ [1, ∞[, where μ is an infinitesimally invariant measure. The proof is based on exponential moment estimates on