Remark on the Stability of Energy Maximizers for the 2D Euler equation on T2

Abstract

It is well-known that the first energy shell, \[S1c0:=\α (x+μ)+β(y+λ): α2+β2=c0\,\, \&\,\, (μ,λ)∈R2\\] of solutions to the 2d Euler equation is Lyapunov stable on T2. This is simply a consequence of the conservation of energy and enstrophy. Using the idea of Wirosoetisno and Shepherd WS, which is to take advantage of conservation of a properly chosen Casimir, we give a simple and quantitative proof of the L2 stability of single modes up to translation. In other words, each \[S1α,β:=\α (x+μ)+β(y+λ): (μ,λ)∈R2\\] is Lyapunov stable. Interestingly, our estimates indicate that the extremal cases α=0, β=0, and α=β may be markedly less stable than the others.