Well-posedness for the dNLS hierarchy

Abstract

We prove well-posedness for higher-order equations in the so-called dNLS hierarchy (also known as part of the Kaup-Newell hierarchy) in almost critical Fourier-Lebesgue and in modulation spaces. Leaning in on estimates proven by the author in a previous instalment Adams (2024), where a similar well-posedness theory was developed for the equations of the NLS hierarchy, we show the jth equation in the dNLS hierarchy is locally well-posed for initial data in Hsr(R) for s 12 + j-1r' and 1 < r 2 and also in Ms2, p(R) for s j2 and 2 p < ∞. Supplementing our results with corresponding ill-posedness results in Fourier-Lebesgue and modulation spaces shows optimality. Our arguments are based on the Fourier restriction norm method in Bourgain spaces adapted to our data spaces and the gauge-transformation commonly associated with the dNLS equation. For the latter we establish bi-Lipschitz continuity between appropriate modulation spaces and that even for higher-order equations `bad' cubic nonlinear terms are lifted from the equation.

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