Some new Liouville type theorems for the 3D stationary magneto-micropolar fluid equations

Abstract

In this paper, we investigate Liouville type theorems for the 3D stationary magneto-micropolar fluid equations and micropolar fluid equations. Adopting an iteration procedure, taking advantage of the special structure of the equations and using a novel combination of interpolation techniques, we establish Liouville type theorems if the smooth solution satisfies certain growth conditions in terms of Lp-norms on the annuli. Furthermore, combining the energy method and some subtle ODE analysis, we relax the growth conditions on the velocity field and the magnetic field by logarithmic factors and obtain logarithmic improvement of Liouville type theorems. Compared with the velocity and the magnetic field, we raise the most relaxed restriction for the angular velocity. More specifically, we allow Lq-norm of the angular velocity on the annuli to grow polynomially at any degree, i.e. \|ω\|Lq(B2R B3R/2) is permitted to grow as fast as RN at infinity, where N is an arbitrary positive integer.