---
res:
  bibo_abstract:
  - "We consider the derivative nonlinear Schrödinger 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. We first discuss whether
    ensembles of orbits with L^2-equicontinuous initial data remain equicontinuous
    under evolution. We prove that this is true under the restriction \r\nM(q)=∫∣∣q∣∣2<4π.
    We conjecture that this restriction is unnecessary. Further, we prove that the
    problem is globally well posed for initial data in H1∕6 under the same restriction
    on M. Moreover, we show that this restriction would be removed by a successful
    resolution of our equicontinuity conjecture.@eng"
  bibo_authorlist:
  - foaf_Person:
      foaf_givenName: Rowan
      foaf_name: Killip, Rowan
      foaf_surname: Killip
  - foaf_Person:
      foaf_givenName: Maria
      foaf_name: Ntekoume, Maria
      foaf_surname: Ntekoume
  - foaf_Person:
      foaf_givenName: Monica
      foaf_name: Visan, Monica
      foaf_surname: Visan
      foaf_workInfoHomepage: http://www.librecat.org/personId=056daca0-b8d1-11f0-964f-f91054abf8ca
  bibo_doi: 10.2140/apde.2023.16.1245
  bibo_issue: '5'
  bibo_volume: 16
  dct_date: 2023^xs_gYear
  dct_isPartOf:
  - http://id.crossref.org/issn/2157-5045
  - http://id.crossref.org/issn/1948-206X
  dct_language: eng
  dct_publisher: Mathematical Sciences Publishers@
  dct_title: On the well-posedness problem for the derivativenonlinear Schrödinger
    equation@
...
