Large-data equicontinuity for the derivative NLS

Abstract

We consider the derivative NLS equation in one spatial dimension, which is known to be completely integrable. We prove that the orbits of L2 bounded and equicontinuous sets of initial data remain bounded and equicontinuous, not only under this flow, but under the entire hierarchy. This allows us to remove the small-data restriction from prior conservation laws and global well-posedness results.

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