Cubic NLW/NLKG on R4

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Scaling is $s_{c}=1$ .
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.
- One has strong uniqueness in the energy class Pl-p5, FurPlTer2001. This argument extends to other energy-critical and sub-critical powers in dimensions 4 and higher.
- 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 SaSw1994 (see also Gl1990, Gl1992, Sw1988, Sw1992, BaSa1998, BaGd1997).
- In the focussing case there is blowup from large data by the ODE method.

Cubic NLW/NLKG on R4

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