Semilinear Schrodinger equation

The semilinear Schrodinger equation (NLS) is

${\displaystyle i\partial _{t}u+\Delta u=\pm |u|^{p-1}u}$

for p>1. There are many specific cases of this equation which are of interest, but in this page we shall focus on the general theory. The ${\displaystyle +}$ sign choice is the defocusing case; ${\displaystyle -}$ is focussing. There are also several variants of NLS, such as NLS with potential or NLS on manifolds and obstacles; see the general page on Schrodinger equations for more discussion.

Theory

• Algebraic structure (Symmetries, conservation laws, transformations, Hamiltonian structure)
• Well-posedness (both local and global)
• Scattering (as well as asymptotic completeness and existence of wave operators)
• Stability of solitons (orbital and asymptotic)
• Blowup
• Unique continuation

Specific semilinear Schrodinger equations

• Quadratic NLS
• Cubic NLS (on R, on R^2, on R^3, etc.)
• Quartic NLS
• Quintic NLS
• Septic NLS
• Mass critical NLS