Ill-posedness of the Novikov equation in the critical Besov space B1∞,1(R)

Abstract

It is shown that both the Camassa-Holm and Novikov equations are ill-posed in Bp,r1+1/p(R) with (p,r)∈[1,∞]×(1,∞] in Guo2019 and well-posed in Bp,11+1/p(R) with p∈[1,∞) in Ye. Recently, the ill-posedness for the Camassa-Holm equation in B1∞,1(R) has been proved in Guo. In this paper, we shall solve the only left an endpoint case r=1 for the Novikov equation. More precisely, we prove the ill-posedness for the Novikov equation in B1∞,1(R) by exhibiting the norm inflation phenomena.