Dynamics of non-relativistic Chern-Simons solitons

We study the system of elliptic equations defined over a doubly-periodic domain in R 2 , where the coefficients are specifically given by the physical model. This system arises in a self-dual non-relativistic Maxwell Chern Simons theory coupled with a neutral scalar field in (2+1)-dimensional space

The non-relativistic Maxwell Chern Simons model recently introduced by Manton is shown to admit self-dual vortex solutions with non-zero electric field. The interrelated ``geometric'' and ``hidden'' symmetries are explained. The theory is also extended to (non-relativistic) spinors. A relativistic,

The symmetry algebra of the planar nonlinear Schrödinger equation minimally coupled to Chern-Simons gauge fields is systematically determined. It is confirmed to be the semidirect sum of the eight dimensional Schrödinger algebra sch(2) (with no central extension) and of the infinitesimal gauge trans

The two-dimensional self-dual equations are the governing equations of the static zeroenergy vortex solutions for the non-relativistic, non-Abelian Chern-Simons models. The zero modes of the non-relativistic vortices are examined by index calculation for the self-dual equations. The index for the se