Ill-posedness of basic equations of fluid dynamics in Besov spaces

Abstract

We give a construction of a divergence-free vector field u0 ∈ Hs B-1∞,∞, for all s<1/2, such that any Leray-Hopf solution to the Navier-Stokes equation starting from u0 is discontinuous at t=0 in the metric of B-1∞,∞. For the Euler equation a similar result is proved in all Besov spaces Bsr,∞ where s>0 if r>2, and s>n(2/r-1) if 1 ≤ r ≤ 2.