Quintic NLS on T

The theory of the quintic NLS on the circle is as follows.

• This equation may be viewed as a simpler version of cubic DNLS, and is always at least as well-behaved.
• Scaling is ${\displaystyle s_{c}=0\,}$.
• LWP is known for ${\displaystyle s>0\,}$ Bo1993.
  • For ${\displaystyle s<0\,}$ the solution map is not uniformly continuous from ${\displaystyle C^{k}\,}$ to ${\displaystyle C^{-k}\,}$ for any ${\displaystyle k\,}$ CtCoTa-p3.
• GWP is known in the defocusing case for ${\displaystyle s>4/9\,}$ (De Silva, Pavlovic, Staffilani, Tzirakis)
  • For ${\displaystyle s>2/3\,}$ this is commented upon in Bo-p2 and is a minor modification of CoKeStTkTa-p.
  • For ${\displaystyle s\geq 1\,}$ one has GWP in the defocusing case, or in the focusing case with small ${\displaystyle L^{2}\,}$ norm, by Hamiltonian conservation.
    • In the defocusing case one has GWP for random data whose Fourier coefficients decay like ${\displaystyle 1/|k|\,}$ (times a Gaussian random variable) Bo1995c; this is roughly of the regularity of ${\displaystyle H^{1/2}\,}$. Indeed one has an invariant measure. In the focusing case the same result holds assuming the ${\displaystyle L^{2}\,}$ norm is sufficiently small.