Conserved energies for the one dimensional Gross-Pitaevskii equation: low regularity case

Abstract

We construct a family of conserved energies for the one dimensional Gross-Pitaevskii equation, but in the low regularity case (in KL we have constructed conserved energies in the high regularity situation). This can be done thanks to regularization procedures and a study of the topological structure of the finite-energy space. The asymptotic (regularised conserved) phase change on the real line with values in /2π is studied. We also construct a conserved quantity, the renormalized momentum H1 (see Theorem thm:E1), on the universal covering space of the finite-energy space.