Illposedness for a twocomponent Novikov system in Besov space

Abstract

In this paper, we consider the Cauchy problem for a two-component Novikov system on the line. By specially constructed initial data (0, u0) in Bp, ∞s-1(R)× Bp, ∞s(R) with s>\2+1p, 52\ and 1≤ p ≤ ∞, we show that any energy bounded solution starting from (0, u0) does not converge back to (0, u0) in the metric of Bp, ∞s-1(R)× Bp, ∞s(R) as time goes to zero, thus results in discontinuity of the data-to-solution map and ill-posedness.