A Liouville Theorem for the Axially-symmetric Navier-Stokes Equations

Abstract

Let v(x, t)= vr er + vθ eθ + vz ez be a solution to the three-dimensional incompressible axially-symmetric Navier-Stokes equations. Denote by b = vr er + vz ez the radial-axial vector field. Under a general scaling invariant condition on b, we prove that the quantity = r vθ is H\"older continuous at r = 0, t = 0. As an application, we give a partial proof of a conjecture on Liouville property by Koch-Nadirashvili-Seregin-Sverak in KNSS and Seregin-Sverak in SS. As another application, we prove that if b ∈ L∞([0, T], BMO-1), then v is regular. This provides an answer to an open question raised by Koch and Tataru in KochTataru about the uniqueness and regularity of Navier-Stokes equations in the axially-symmetric case.