Well-posedness and ill-posedness of the fifth order modifed KdV equation

Abstract

We consider the initial value problem of the fifth order modified KdV equation on the Sobolev spaces. ∂t u - ∂x5u + c1∂x3(u3) + c2u∂x u∂x2 u + c3uu∂x3 u =0, u(x,0)= u0(x) where u:R×R R and cj's are real. We show the local well-posedness in Hs(R) for s ≥ 3/4 via the contraction principle on Xs,b space. Also, we show that the solution map from data to the solutions fails to be uniformly continuous below H3/4(R). The counter example is obtained by approximating the fifth order mKdV equation by the cubic NLS equation.