Poincar\'e-Dulac normal form reduction for unconditional well-posedness of the periodic cubic NLS
Abstract
We implement an infinite iteration scheme of Poincare-Dulac normal form reductions to establish an energy estimate on the one-dimensional cubic nonlinear Schrodinger equation (NLS) in Ct L2(T), without using any auxiliary function space. This allows us to construct weak solutions of NLS in Ct L2(T)$ with initial data in L2(T) as limits of classical solutions. As a consequence of our construction, we also prove unconditional well-posedness of NLS in Hs(T) for s ≥ 1/6.
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