Cubic NLW/NLKG on R

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Scaling is $s_{c}=-1/2$ .
LWP for $s\geq 1/6$ $s\geq 1/6$ by energy estimates and Sobolev (solution is in $L_{x}^{3}$ $L_{x}^{3}$ ).
- For $s<1/6$ one has ill-posedness (CtCoTa-p2), indeed it is not even possible to make sense of solutions in the distributional sense.
GWP for $s>1/3$ $s>1/3$ for defocussing NLKG (Bo1999)
- For $s\geq 1$ this is clear from energy conservation (for both NLKG and NLW).
- 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.
Remark: NLKG can be viewed as a symplectic flow with the symplectic form of $H^{1/2}$ . NLW is similar but with the homogeneous $H^{1/2}$ .
Small global solutions to NLKG (either focusing or defocusing) have logarithmic phase corrections due to the critical nature of the nonlinearity (neither short-range nor long-range).However there is still an asymptotic development and an asymptotic completeness theory, see De2001, LbSf-p.

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