Determining the viscosity from the boundary information for incompressible fluid

Abstract

For the Stokes equations in a compact connected Riemannian n-manifold (,g) with smooth boundary ∂ , we give an equivalent new system of elliptic equations with (n+1) independent unknown functions on . We show that the Dirichlet-to-Neumann map ε, μ,g associated with this new system is also equivalent to the original Dirichlet-to-Neumann map μ,g associated with the Stokes equations. We explicitly give the full symbol expression for the ε,μ,g by a method of factorization, and prove that Dirichlet-to-Neumann map ε,μ,g (or equivalently, μ, g) uniquely determines viscosity μ and all tangential and normal derivatives of μ on ∂ . In particular, combining this result, Lai-Uhlmann-Wang's theorem and Heck-Li-Wang's theorem, we completely solve a long-standing open problem that asks whether one can determine the viscosity for the Stokes equations and for the Navier-Stokes equations by boundary measurements on an arbitrary bounded domain in Rn, (n=2,3).