L1 approach to the compressible viscous fluid flows in the half-space
Abstract
In this paper, we prove the local well-posedness for the Navier-Stokes equations describing the motion of isotropic barotoropic compressible viscous fluid flow with non-slip boundary conditions, where the fluid domain is the N dimensional half-sapce. We solve the equations in the L1 in time and Besov spaces Bsq,1 in space maximal regularity framework. Here, we assume that -1+N/q ≤ s < 1/q and N-1 < q < 2N. We use Lagrange transformation to eliminate the convection term and we use an analytic semigroup approach. We only assume the strictly positiveness of initial mass density.
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