Quadratic NLW/NLKG

[Thanks to Chengbo Wang for some corrections \u2013 Ed.]

• Scaling is ${\displaystyle s_{c}=d/2-2}$.
• For ${\displaystyle d>4}$ LWP is known for ${\displaystyle s\geq d/2-2}$ by Strichartz estimates LbSo1995. This is sharp by scaling arguments.
• For ${\displaystyle d=4}$ LWP is known for ${\displaystyle s\geq 1/4}$ by Strichartz estimates LbSo1995.This is sharp from Lorentz invariance (concentration) considerations.
• For ${\displaystyle d=3}$ LWP is known for ${\displaystyle s>0}$ by Strichartz estimates LbSo1995.
  • One has ill-posedness for ${\displaystyle s=0}$ Lb1996. This is related to the failure of endpoint Strichartz when ${\displaystyle d=3}$.
• For ${\displaystyle d=1,2}$ LWP is known for ${\displaystyle s\geq 0}$ by Strichartz estimates (or energy estimates and Sobolev in the ${\displaystyle d=1}$ case).
  • For s<0 one has rather severe ill-posedness generically, indeed cannot even interpret the non-linearity ${\displaystyle f^{2}}$ as a distribution [CtCoTa-p2].
  • In the two-speed case ([#two-speed see Overview]) one can improve this to ${\displaystyle s>-1/4}$ for non-linearities of the form ${\displaystyle F=uv}$ and ${\displaystyle G=uv}$ [Tg-p].