Contrast between Lagrangian and Eulerian analytic regularity properties of Euler equations

Abstract

We consider the incompressible Euler equations on Rd, where d ∈ \ 2,3 \. We prove that: (a) In Lagrangian coordinates the equations are locally well-posed in spaces with fixed real-analyticity radius (more generally, a fixed Gevrey-class radius). (b) In Lagrangian coordinates the equations are well-posed in highly anisotropic spaces, e.g.~Gevrey-class regularity in the label a1 and Sobolev regularity in the labels a2,...,ad. (c) In Eulerian coordinates both results (a) and (b) above are false.