Quintic NLW/NLKG on R3

Scaling is $s=1$ .
LWP for $s\geq 1$ $s\geq 1$ by Strichartz estimates (see e.g. LbSo1995; earlier references exist)
- When $s=1$ the time of existence depends on the profile of the data and not just on the norm.
- For $s<s_{c}$ one has instantaneous blowup in the focusing case, and unbounded growth of $H^{s}$ norms in the defocusing case [CtCoTa-p2]
GWP for $s=1$ $s=1$ in the defocussing case Gl1990, Gl1992. The main new ingredient is energy non-concentration Sw1988, Sw1992
- Further decay estimates and scattering were obtained in BaSa1998; global Lipschitz dependence was obtained in BaGd1997.
- For smooth data GWP and scattering was shown in Gl1992; see also SaSw1994
- For radial data GWP and scattering was shown in Sw1988
- For data with small energy this was shown for general quintic non-linearities (and for either NLW or NLKG) in Ra1981.
- Global weak solutions can be constructed by general methods (e.g. Sr1989, Sw1992); uniqueness was shown in Kt1992
- In the focussing case there is blowup from large data by the ODE method.
- When there is a convex obstacle GWP for smooth data is known SmhSo1995.

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