Liouville Theorems for Stationary Navier-Stokes Equations via the Radial Velocity Component

Abstract

We study Liouville-type results for the stationary Navier--Stokes equations in R3. We prove that any H1(R3) solution is trivial under an integrability condition imposed only on the radial component of the velocity, namely u(x) ∈ Lp(R3) with 3/2 < p ≤ 3. We also establish a uniqueness result in a variable-exponent setting, where an L6-type condition is required only on a bounded region, while the exponent approaches the critical value 3 at infinity. Our analysis reveals that the rigidity of the stationary Navier--Stokes system can be driven by localized and radial integrability properties, rather than uniform global conditions.