Regularity of the velocity field for Euler vortex patch evolution

Abstract

We consider the vortex patch problem for both the 2-D and 3-D incompressible Euler equations. In 2-D, we prove that for vortex patches with Hk-0.5 Sobolev-class contour regularity, k 4, the velocity field on both sides of the vortex patch boundary has Hk regularity for all time. In 3-D, we establish existence of solutions to the vortex patch problem on a finite-time interval [0,T], and we simultaneously establish the Hk-0.5 regularity of the two-dimensional vortex patch boundary, as well as the Hk regularity of the velocity fields on both sides of vortex patch boundary, for k 3.