Remark on single exponential bound of the vorticity gradient for the two-dimensional Euler flow around a corner
Abstract
In this paper, the two dimensional Euler flow under a simple symmetry condition with hyperbolic structure in a unit square D=\(x1,x2):0<x1+x2<2,0<-x1+x2<2\ is considered. It is shown that the Lipschitz estimate of the vorticity on the boundary is at most single exponential growth near the stagnation point.
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