Cubic NLW/NLKG on R3

Scaling is $s_{c}=1/2$ .
LWP for $s\geq 1/2$ $s\geq 1/2$ by Strichartz estimates (see e.g. LbSo1995; earlier references exist)
- When $s=1/2$ the time of existence depends on the profile of the data and not just on the norm.
- One can improve the critical space $H^{1/2}$ to a slightly weaker Besov space [Pl-p2].
- For $s<1/2$ one has instantaneous blowup in the focusing case, and unbounded growth of H^s norms in the defocusing case [CtCoTa-p2]
GWP for $s>3/4$ $s>3/4$ KnPoVe-p2 for defocussing NLKG.(An alternate proof is in GalPl2003).
- For $s\geq 1$ this is clear from energy conservation (for both NLKG and NLW).
- One also has GWP and scattering for data with small $H^{1/2}$ norm for general cubic non-linearities (and for either NLKG or NLW).
- In the defocussing case one has scattering for large $H^{1}$ data BaeSgZz1990, see also [Hi-p3].
- Improvement is certainly possible, both in lowering the s index and in replacing NLKG with NLW.
- In the focussing case there is blowup from large data by the ODE method.
For periodic defocussing NLKG there is a weak turbulence effect in $H^{s}$ for $s>5$ (low frequencies decay in time) but a symplectic non-squeezing effect in H^{1/2} Kuk1995b.In particular $H^{s}$ cannot be a symplectic phase space for $s>5$ .

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