The Calogero--Moser Derivative Nonlinear Schr\"odinger Equation

Abstract

We study the Calogero--Moser derivative NLS equation i ∂t u +∂xx u + (D+|D|)(|u|2) u =0 posed on the Hardy-Sobolev space Hs+(R) with suitable s>0. By using a Lax pair structure for this L2-critical equation, we prove global well-posedness for s ≥ 1 and initial data with sub-critical or critical L2-mass \| u0 \|L22 ≤ 2 π. Moreover, we prove uniqueness of ground states and also classify all traveling solitary waves. Finally, we study in detail the class of multi-soliton solutions u(t) and we prove that they exhibit energy cascades in the following strong sense such that \|u(t)\|Hs s |t|2s as t ∞ for every s > 0. abstract