On Liouiville Type Theorem for the 3D Isentropic Navier-Stokes System without D-condition

Abstract

In this paper, we establish Liouville-type theorems for the steady compressible Navier-Stokes system. Assuming a smooth solution \(u ∈ Lp(R3)\), \(3 p 92\), with bounded density, one obtains \(u 0\). This generalizes the result of Li-Yu Li-Yu by removing the Dirichlet condition \(∫R3 |∇ u|2 \, dx < ∞\). If \(92 < p < 6\), Liouville-type theorem holds under the additional oscillation condition for momentum \( u ∈ B3p - 32∞,∞(R3)\). For the marginal case \(u ∈ L6(R3)\), the oscillation condition can be replaced by \( u ∈ BMO-1(R3)\). We also present results in Morrey-type spaces: \(u ∈ Ms,6(R3)\) and \( u ∈ Mwq,3(R3)\) for \(2 s 6\) and \(32 < q 3\).