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

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

2007-11-07

arxiv.org/abs/0711.1060v1

Mathematics

Analysis of PDEs

16 pages

Scientific paper

We consider the initial value problem of the fifth order modified KdV equation on the Sobolev spaces. \partial_t u - \partial_x^5u + c_1\partial_x^3(u^3) + c_2u\partial_x u\partial_x^2 u + c_3uu\partial_x^3 u =0, u(x,0)= u_0(x) where $ u:R\timesR \to R $ and $c_j$'s are real. We show the local well-posedness in H^s(R) for s \geq 3/4 via the contraction principle on $X^{s,b}$ space. Also, we show that the solution map from data to the solutions fails to be uniformly continuous below $H^{3/4}(R)$. The counter example is obtained by approximating the fifth order mKdV equation by the cubic NLS equation.

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