Instability of unidirectional flows for the 2D α-Euler equations

Abstract

We study stability of unidirectional flows for the linearized 2D α-Euler equations on the torus. The unidirectional flows are steady states whose vorticity is given by Fourier modes corresponding to a vector p ∈ Z2. We linearize the α-Euler equation and write the linearized operator LB in 2( Z2) as a direct sum of one-dimensional difference operators LB, q in 2( Z) parametrized by some vectors q∈ Z2 such that the set \ q +n p:n ∈ Z\ covers the entire grid Z2. The set \ q +n p:n ∈ Z\ can have zero, one, or two points inside the disk of radius \| p\|. We consider the case where the set \ q +n p:n ∈ Z\ has exactly one point in the open disc of radius p. We show that unidirectional flows that satisfy this condition are linearly unstable. Our main result is an instability theorem that provides a necessary and sufficient condition for the existence of a positive eigenvalue to the operator LB, q in terms of equations involving certain continued fractions. Moreover, we are also able to provide a complete characterization of the corresponding eigenvector. The proof is based on the use of continued fractions techniques expanding upon the ideas of Friedlander and Howard.