Exact boundary controllability of the 3D incompressible ideal MHD system

Abstract

We consider the three-dimensional ideal MHD system on a domain ' ⊂ R3 with a part of the boundary~∂ , where we prescribe both u· n and b· n, while u· n = b· n =0 on ∂ ' . We prove the boundary controllability of the system, namely that we can prescribe the boundary data such that the unique solution of the system with initial state (u0,b0) achieves another state (u1,b1) in finite time, where u0,b0,u1,b1 are arbitrary divergence-free vector fields satisfying impermeability boundary condition which are extendable to vector fields with the same properties on any bounded domain obtained by extension of ' via . As a byproduct, we give the first local well-posedness proof of incompressible, ideal MHD system, which does not use Elsasser variables and is thus applicable to any bounded domain with sufficient Sobolev regularity. We also provide a new and simple proof of the 2D controllability.

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