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A refined global well-posedness result for schrödinger equations with derivative
J. Colliander
,
M. Keel
, G. Staffilani
, H. Takaoka
, T. Tao
School of Mathematics
Research output
:
Contribution to journal
›
Article
›
peer-review
147
Scopus citations
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Keyphrases
Schrödinger Equation
100%
Global Well-posedness
100%
Well-posedness Results
100%
Well-posed
66%
Energy Conservation
33%
I-method
33%
Defocus
33%
Cauchy Problem
33%
Nonlinear Term
33%
Quintic
33%
Uniform Continuity
33%
Mathematics
Posedness
100%
Schr Dinger Equation
100%
Initial Datum
33%
Uniform Continuity
33%
Nonlinear Term
33%