Removing Type II singularities off the axis for the 3D axisymmetric Euler equations

Abstract

We prove local blow-up criterion for smooth axisymmetric solutions to the 3D incompressible Euler equation. If the vorticity satisfies ∫l0t* (t*-t) \| ω (t)\| L∞(B(x , R0)) dt <+∞ for a ball B(x , R0) away from the axis of symmetry, then there exists no singularity at t=t* in the torus T(x*, R) generated by rotation of the ball B(x , R0) around the axis. This implies that possible singularity at t=t* in the torus T(x*, R) is excluded if the vorticity satisfies the blow-up rate \| (t)\|L∞ (T(x*, R))= O(1(t*-t)γ) as t t*, where γ <2 and the torus T(x*, R) does not touch the axis.