The regularity of the boundary of vortex patches for some non-linear transport equations
Abstract
We prove the persistence of boundary smoothness of vortex patches for a non-linear transport equation in Rn with velocity field given by convolution of the density with an odd kernel, homogeneous of degree -(n-1) and of class C2(Rn\0\, Rn). This allows the velocity field to have non-trivial divergence. The quasi-geostrophic equation in R3 and the Cauchy transport equation in the plane are examples.
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