Well-posedness for the periodic Intermediate nonlinear Schrödinger equation
Abstract
We study the well-posedness for the intermediate nonlinear Schrödinger equation (INLS) with periodic boundary conditions. Using a gauge transform, we obtain large data local well-posedness in Hs(T) for any s≥ 12. We extend this result to global well-posedness under a small L2-norm constraint by exploiting the complete integrability of the continuum Calogero-Moser equation (CCM). We also establish additional results such as the unconditional well-posedness in the energy space and the convergence of solutions to INLS to those of CCM in the infinite-depth limit.
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