Sharp global well-posedness for 1D NLS with derivatives
Abstract
We show that the 1d derivative nonlinear Schr\"odinger equation (equ) is globally well-posed in Hs(R) for s≥ 1/2. We use the linear-nonlinear decomposition method to take advantage of the local smoothing effect of the nonlinearity, which enables us to establish a refined version of the almost conservation law. Note that H1/2 is the endpoint that we have uniform continuous for the solution map and hence our result is sharp.
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