Sharp well-posedness and ill-posedness of the stationary quasi-geostrophic equation

Abstract

We consider the stationary problem for the quasi-geostrophic equation on the whole plane and investigate its well-posedness and ill-posedness. In[Fujii, Ann. PDE 10, 10 (2024)], it was shown that the two-dimensional stationary Navier--Stokes equations are ill-posed in the critical Besov spaces Bp,12p-1(R2) with 1 ≤ p ≤ 2. Although the quasi-geostrophic equation has the same invariant scale structure as the Navier--Stokes equations, we reveal that the quasi-geostrophic equation is well-posed in the scaling critical Besov spaces Bp,q2p-1(R2) with (p,q) ∈ [1,4) × [1,∞] or (p,q)=(4,2) due to the better properties of the nonlinear structure of the quasi-geostrophic equation compared to that of the Navier--Stokes equations. Moreover, we also prove the optimality for the above range of (p,q) ensuring the well-posedness in the sense that the stationary quasi-geostrophic equation is ill-posed for all the other cases.

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