Local Well and Ill Posedness for the Modified KdV Equations in Subcritical Modulation Spaces

Abstract

We consider the Cauchy problem of the modified KdV equation (mKdV). Local well-posedness of this problem is obtained in modulation spaces M1/42,q(R) (2≤ q≤∞). Moreover, we show that the data-to-solution map fails to be C3 continuous in Ms2,q(R) when s<1/4. It is well-known that H1/4 is a critical Sobolev space of mKdV so that it is well-posedness in Hs for s≥ 1/4 and ill-posed (in the sense of uniform continuity) in Hs' with s'<1/4. Noticing that M1/42,q ⊂ B1/q-1/42,q is a sharp embedding and H-1/4⊂ B-1/42,∞, our results contains all of the subcritical data in M1/42,q, which contains a class of functions in H-1/4 H1/4.