Cubic NLS on R4

Cubic NLS on ${\displaystyle \mathbb {R} ^{4}}$

Description
Equation	${\displaystyle iu_{t}+\Delta u=\pm |u|^{2}u}$
Fields	${\displaystyle u:\mathbb {R} \times \mathbb {R} ^{4}\to \mathbb {C} }$
Data class	${\displaystyle u(0)\in H^{s}(\mathbb {R} ^{4})}$
Basic characteristics
Structure	Hamiltonian
Nonlinearity	semilinear
Linear component	Schrodinger
Critical regularity	${\displaystyle {\dot {H}}^{1}(\mathbb {R} )}$
Criticality	mass-supercritical; energy-critical; scattering-subcritical
Covariance	Galilean
Theoretical results
LWP	${\displaystyle H^{s}(\mathbb {R} )}$ for ${\displaystyle s\geq 1}$
GWP	${\displaystyle H^{s}(\mathbb {R} )}$ for ${\displaystyle s\geq 1}$ (+) or for ${\displaystyle s\geq 1}$, small norm (-)
Related equations
Parent class	cubic NLS
Special cases	-
Other related	quintic NLS on R3

The theory of the cubic NLS in R^4 is as follows.

• Scaling is ${\displaystyle s_{c}=1\,}$.
• LWP is known for ${\displaystyle s\geq 1\,}$ CaWe1990.
  • For ${\displaystyle s=1\,}$ the time of existence depends on the profile of the data as well as the norm.
  • For ${\displaystyle s<1\,}$ we have ill-posedness, indeed the H^s norm can get arbitrarily large arbitrarily quickly CtCoTa-p2. In the focusing case we have instantaneous blowup from the virial identity and scaling.
• GWP and scattering for ${\displaystyle s\geq 1\,}$ in the radial case Bo1999. A major obstacle is that the Morawetz estimate only gives ${\displaystyle L^{4}\,}$-type spacetime control rather than ${\displaystyle L^{6}\,.}$
  • For small non-radial ${\displaystyle H^{1}\,}$ data one has GWP and scattering. In fact one has scattering whenever the solution has a bounded ${\displaystyle L^{6}\,}$ norm in spacetime.

The large data non-radial case is still open, and very interesting. The main difficulty is infinite speed of propagation and the possibility that the ${\displaystyle H^{1}\,}$ norm could concentrate at several different places simultaneously.