L1 approach to the compressible viscous fluid flows in the half-space

Abstract

In this paper, we proved the local well-posedness for the Navier-Stokes equtions describing the motion of isotropic barotoropic compressible viscous fluid flow with non-slip boundary conditions, wehre the fluid domain is the half-space in the N-dimensional Euclidean space. The density part of solutions and their time derivative belong to L1 in time with some Besov spaces in space and also the velosity parts and their time derivative belong to L1 in time with some Besov spaces in space. We use Lagrange transformation to eliminate the covection term and we use an analytic semgroup approach. Our Stokes semigroup is not only a continuous analytic semigroup but also has an L1 in times maximal regularity with some Besov spaces in space.

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