Strong ill-posedness of logarithmically regularized 2D Euler equations in the borderline Sobolev Space

Abstract

Logarithmically regularized 2D Euler equations are active scalar equations with the non-local velocity u = ∇ -1Tγ ω for the scalar ω. Two types of the regularizing operator Tγ with a parameter γ> 0 are considered: Tγ = -γ (e+|∇|) and Tγ = -γ (e-). These models regularize the 2D Euler equation for the vorticity (conventionally corresponding to the γ=0 case), which results in their local well-posedness in the borderline Sobolev space H1(R2)H-1(R2) when γ> 12. In this paper, we examine the regularized models in the remaining regime γ≤ 12 and establish the strong ill-posedness in the borderline space. This completely solves the well-posedness problem of the regularized models in the borderline space by closing the gap between the local well-posedness result for γ> 12 and the strong ill-posedness for γ = 0.