Separation for the stationary Prandtl equation

Abstract

In this paper, we prove that separation occurs for the stationary Prandtl equation, in the case of adverse pressure gradient, for a large class of boundary data at x=0.We justify the Goldstein singularity: more precisely, we prove that under suitable assumptions on the boundary data at x=0, there exists x*>0 such that \y u\y=0(x) C x* -x as x x* for some positive constant C, where u is the solution of the stationary Prandtl equation in the domain \0<x<x*,\ y>0\. Our proof relies on three main ingredients: the computation of a "stable" approximate solution, using modulation theory arguments, a new formulation of the Prandtl equation, for which we derive energy estimates, relying heavily on the structure of the equation, and maximum principle techniques to handle nonlinear terms.