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On the well-posedness problem for the derivativenonlinear Schrödinger equation

Rowan Killip, Maria Ntekoume, Monica Vişan

2023Analysis & PDE26 citationsDOIOpen Access PDF

Abstract

We consider the derivative nonlinear Schr\"odinger equation in one space dimension, posed both on the line and on the circle. This model is known to be completely integrable and $L^2$-critical with respect to scaling. The first question we discuss is whether ensembles of orbits with $L^2$-equicontinuous initial data remain equicontinuous under evolution. We prove that this is true under the restriction $M(q)=\int |q|^2 < 4\pi$. We conjecture that this restriction is unnecessary. Further, we prove that the problem is globally well-posed for initial data in $H^{1/6}$ under the same restriction on $M$. Moreover, we show that this restriction would be removed by a successful resolution of our equicontinuity conjecture.

Topics & Concepts

EquicontinuityMathematicsConjectureIntegrable systemNonlinear Schrödinger equationMathematical analysisDimension (graph theory)Nonlinear systemSchrödinger equationDerivative (finance)Space (punctuation)Initial value problemPure mathematicsMathematical physicsPhysicsQuantum mechanicsEconomicsLinguisticsFinancial economicsPhilosophyAdvanced Mathematical Physics ProblemsNonlinear Waves and SolitonsBlack Holes and Theoretical Physics