Ill-posedness in Bsp,∞ of the Euler equations: Non-continuous dependence

Abstract

In this paper, we solve an open problem left in the monographs [Bahouri-Chemin-Danchin, (2011)]BCD. Precisely speaking, it was obtained in [Theorem 7.1 on pp293, (2011)]BCD the existence and uniqueness of Bsp,∞ solution for the Euler equations. We furthermore prove that the solution map of the Euler equation is not continuous in the Besov spaces from Bsp,∞ to LT∞ Bsp,∞ for s>1+d/p with 1≤ p≤ ∞ and in the H\"older spaces from Ck,α to LT∞ Ck,α with k∈ N+ and α∈(0,1), which later covers particularly the ill-posedness of C1,α solution in [Trans. Amer. Math. Soc., (2018)]MYtams. Beyond purely technical aspects on the choice of initial data, a remarkable novelty of the proof is the construction of an approximate solution to the Burgers equation.