Local exact Lagrangian controllability for 1D barotropic compressible Navier--Stokes equations

Abstract

We consider a viscous compressible barotropic flow in the interval [0,π] with homogeneous Dirichlet boundary conditions for the flow velocity and a constant rest state as initial data. Given two sufficiently close subintervals I=[α1,α2] and J=[β1,β2] of (0,1), a nonempty open set ω ⊂ (1,π), and T>0, we construct an external force f supported in ω acting on the momentum equation such that the corresponding flow map moves the fluid particles initially occupying I exactly onto J in time T.

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