On the positive constant in Arnold's second stability theorem for a bounded domain

Abstract

For a steady flow of a two-dimensional ideal fluid, the gradient vectors of the stream function and its vorticity ω are collinear. Arnold's second stability theorem states that the flow is Lyapunov stable if 0<∇ω/∇<Car for some Car>0. In this paper, we show that, for a bounded domain, Car can be taken as the first eigenvalue 1 of a certain Laplacian eigenvalue problem. When ∇ω/∇ reaches 1, instability may occur, as illustrated by a non-circular steady flow in a disk; however, a certain form of structural stability still holds. Based on these results, we establish a theorem on the rigidity and orbital stability of steady Euler flows in a disk.