Global existence for the critical dissipative surface quasi-geostrophic equation

Abstract

In this article, we study the critical dissipative surface quasi-geostrophic equation (SQG) in R2. Motivated by the study of the homogeneous statistical solutions of this equation, we show that for any large initial data θ0 liying in the space s ( Hsuloc(R2)) L∞(R2) the critical (SQG) has a global weak solution in time for all 1/2< s<1. Our proof is based on an energy inequality verified by the truncated (SQG)R, equation. By classical compactness arguments, we show that we are able to pass to the limit (R → ∞, → 0) in (SQG)R, and that the limit solution has the desired regularity.