On the local existence for an active scalar equation in critical regularity setting

Abstract

In this note, we address the local well-posedness for the active scalar equation ∂t θ + u· ∇ θ =0, where u = - ∇(-)-1+β/2θ. The local existence of solutions in the Sobolev class H1+β+ε, where ε>0 and β ∈ (1,2), has been recently addressed in HKZ. The critical case ε =0 has remained open. Using a different technique, we prove the local well-posedness in the Besov space B1+β2,1, where β ∈ (1,2). The proof is based on log-Lipschitz estimates for the transport equation.