On the regularity of a class of generalized quasi-geostrophic equations

Abstract

In this article we consider the following generalized quasi-geostrophic equation ∂tθ + u·∇ θ + β θ =0, u= α Rθ, x∈R2, where >0, :=-, α∈ ]0,1[ and β∈ ]0,2[. We first show a general criterion yielding the nonlocal maximum principles for the whole space active scalars, then mainly by applying the general criterion, for the case α∈]0,1[ and β∈ ]α+1,2] we obtain the global well-posedness of the system with smooth initial data; and for the case α∈ ]0,1[ and β∈ ]2α,α+1] we prove the local smoothness and the eventual regularity of the weak solution of the system with appropriate initial data.