Maxwell-Schrodinger system

Maxwell-Schrodinger system in $R^{3}$

This system is a partially non-relativistic analogue of the Maxwell-Klein-Gordon system, coupling a U(1) connection $A_{a}\,$ with a complex scalar field u; it is thus an example of a wave-Schrodinger system. The Lagrangian density is

\int F^{ab}F_{ab}+2\Im {\overline {u}}D_{t}u-{\overline {D_{j}u}}D_{j}u\ dxdt

giving rise to the system of PDE

iu_{t}=D_{j}uD_{j}u/2+A_{0}a\,

\partial ^{a}F_{ab}=J_{b}\,

where the current density $J_{b}\,$ is given by

J=|u|^{2};J_{j}=-Im{{\underline {u}}D_{j}u}\,

As with the MKG system, there is a gauge invariance for the connection; one can place A in the Lorenz, Coulomb, or Temporal gauges (other choices are of course possible).

Let us place u in $H^{s}\,$ , and A in $H^{\sigma }H^{\sigma -1}\,.$ The lack of scale invariance makes it difficult to exactly state what the critical regularity would be, but it seems to be $s=\sigma =1/2\,.$

GWP in the energy space $s=\sigma =1$ $s=\sigma =1$ in the Coulomb gauge was established by Bejenaru and Tataru in 2007. The argument also gives a priori estimates when $s>1/2,\sigma =1$ $s>1/2,\sigma =1$ and LWP when $s>3/4,\sigma =1$ $s>3/4,\sigma =1$ .
- In the Lorenz and Temporal gauges, LWP for $s\geq 5/3\,$ and $s-1\leq \sigma \leq s+1,(5s-2)/3$ was established in NkrWad-p
- For smooth data ( $s=\sigma >5/2\,$ ) in the Lorenz gauge this is in NkTs1986 (this result works in all dimensions)
- Global weak solutions were constructed in the energy class ( $s=\sigma =1\,$ ) in the Lorenz and Coulomb gauges GuoNkSr1996.
Modified wave operators have been constructed in the Coulomb gauge in the case of vanishing magnetic field in GiVl-p3, GiVl-p5. No smallness condition is needed on the data at infinity.
- A similar result for small data is in Ts1993
In one dimension, GWP in the energy class is known Ts1995
In two dimensions, GWP for smooth solutions is known TsNk1985

Maxwell-Schrodinger system