Stability of laminar monotone shear flows in a channel for high Reynolds number
Abstract
We consider the stability of a laminar flow U∈ C4([-1,1]) in the two-dimensional channel R ×[-1,1] in the large Reynolds number limit. Assuming that U is strictly monotone but allowing U to vanish, we obtain that if the operator K=-d2dx2+UU- \,, is strictly positive for all ∈R for which U(U-1())=0,then U is stable for sufficiently large Reynolds number. This contribution generalizes previous results mostly by allowing long wave perturbations (but much shorter than the Reynolds number).
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