Ill-posedness for the Navier-Stokes equations in critical Besov spaces B-1∞,q

Abstract

We study the Cauchy problem for the incompressible Navier-Stokes equation align ut - u+u· ∇ u +∇ p=0, \ \ div u=0, \ \ u(0,x)= δ u0. NS align For arbitrarily small δ>0, we show that the solution map δ u0 u in critical Besov spaces B-1∞,q (∀ \ q∈ [1,2]) is discontinuous at origin. It is known that the Navier-Stokes equation is globally well-posed for small data in BMO-1. Taking notice of the embedding B-1∞,q ⊂ BMO-1 (q 2), we see that for sufficiently small δ>0, u0∈ B-1∞,q (q 2) can guarantee that the Navier-Stokes equation has a unique global solution in BMO-1, however, this solution is instable in B-1∞,q and the solution can have an inflation in B-1∞,q for certain initial data. So, our result indicates that two different topological structures in the same space may determine the well and ill posedness, respectively.