Turbulent Threshold for Continuum Calogero-Moser Models

Abstract

We determine the sharp mass threshold for Sobolev norm growth for the focusing continuum Calogero--Moser model. It is known that below the mass of 2π, solutions to this completely integrable model enjoy uniform-in-time Hs bounds for all s ≥ 0. In contrast, we show that for arbitrarily small > 0 there exists initial data u0 ∈ H∞+ of mass 2π + such that the corresponding maximal lifespan solution u : (T-, T+) × R C satisfies t T \|u(t)\|Hs = ∞ for all s > 0. As part of our proof, we demonstrate an orbital stability statement for the soliton and a dispersive decay bound for solutions with suitable initial data.