On the analyticity and Gevrey class regularity up to the boundary for the Euler Equations
arXiv:1007.2012 · doi:10.1088/0951-7715/24/3/004
Abstract
We consider the Euler equations in a three-dimensional Gevrey-class bounded domain. Using Lagrangian coordinates we obtain the Gevrey-class persistence of the solution, up to the boundary, with an explicit estimate on the rate of decay of the Gevrey-class regularity radius.