On global well-posedness of the modified KdV equation in modulation spaces

Abstract

We study well-posedness of the complex-valued modified KdV equation (mKdV) on the real line. In particular, we prove local well-posedness of mKdV in modulation spaces M2,ps(R) for s 14 and 2≤ p < ∞. For s < 14, we show that the solution map for mKdV is not locally uniformly continuous in M2,ps(R). By combining this local well-posedness with our previous work (2018) on an a priori global-in-time bound for mKdV in modulation spaces, we also establish global well-posedness of mKdV in M2,ps(R) for s 14 and 2≤ p < ∞.