Well-posedness for Ohkitani model and long-time existence for surface quasi-geostrophic equations

Abstract

We consider the Cauchy problem for the logarithmically singular surface quasi-geostrophic (SQG) equation, introduced by Ohkitani, ∂t θ - ∇ (10+(-)12)θ · ∇ θ = 0 , and establish local existence and uniqueness of smooth solutions in the scale of Sobolev spaces with exponent decreasing with time. Such a decrease of the Sobolev exponent is necessary, as we have shown in the companion paper that the problem is strongly ill-posed in any fixed Sobolev spaces. The time dependence of the Sobolev exponent can be removed when there is a dissipation term strictly stronger than log. These results improve wellposedness statements by Chae, Constantin, C\'ordoba, Gancedo, and Wu in CCCGW. This well-posedness result can be applied to describe the long-time dynamics of the δ-SQG equations, defined by ∂t θ + ∇ (10+(-)12)-δθ · ∇ θ = 0, for all sufficiently small δ>0 depending on the size of the initial data. For the same range of δ, we establish global well-posedness of smooth solutions to the logarithmically dissipative counterpart: ∂t θ + ∇ (10+(-)12)-δθ · ∇ θ + (10+(-)12)θ = 0.