Zero Energy Solutions and Vortices in Schroedinger Equations
Abstract
All two-dimensional Schr\"odinger equations with symmetric potentials (Va()=-a2ga 2(a-1)/2 with =x2+y2 and a=0) is shown to have zero energy states contained in conjugate spaces of Gel'fand triplets. For the zero energy eigenvalue the equations for all a are reduced to the same equation representing two-dimensional free motions in the constant potential Va=-ga in terms of the conformal mappings of ζa=za with z=x+iy. Namely, the zero energy eigenstates are described by the plane waves with the fixed wave numbers ka=mga/ in the mapped spaces. All the zero energy states are infinitely degenerate as same as the case of the parabolic potential barrier (PPB) shown in ref. sk4. Following hydrodynamical arguments, we see that such states describe stationary flows round the origin, which are represented by the complex velocity potentials W=pa za, (pa being a complex number) and their linear combinations create almost arbitrary vortex patterns. Examples of the vortex patterns in constant potntials and PPB are presented.
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