Self-Dual Vortices in Chern-Simons Hydrodynamics

TL;DR

This paper explores self-dual vortex solutions in a Chern-Simons hydrodynamics framework, revealing quantization conditions and connections to modified nonlinear Schrödinger equations with vortex structures.

Contribution

It introduces a reformulation of Chern-Simons hydrodynamics with quantum potential deformations, deriving vortex solutions and quantization conditions in a planar Madelung fluid context.

Findings

Existence of N-vortex solutions under specific flow conditions.

Quantization of deformation parameter, CS coupling, and quantum potential strength.

Reduction to 1+1 dimensions yields modified NLS and DNLS equations with resonance solitons.

Abstract

The classical theory of non-relativistic charged particle interacting with U(1) gauge field is reformulated as the Schr\"odinger wave equation modified by the de-Broglie-Bohm quantum potential nonlinearity. For, (1 - $\hbar^2$) deformed strength of quantum potential the model is gauge equivalent to the standard Schr\"odinger equation with Planck constant $\hbar$, while for the strength (1 + $\hbar^2$), to the pair of diffusion-anti-diffusion equations. Specifying the gauge field as Abelian Chern-Simons (CS) one in 2+1 dimensions interacting with the Nonlinear Schr\"odinger field (the Jackiw-Pi model), we represent the theory as a planar Madelung fluid, where the Chern-Simons Gauss law has simple physical meaning of creation the local vorticity for the fluid flow. For the static flow, when velocity of the center-of-mass motion (the classical velocity) is equal to the quantum one (generated by quantum potential velocity of the internal motion), the fluid admits N-vortex solution. Applying the Auberson-Sabatier type gauge transform to phase of the vortex wave function we show that deformation parameter $\hbar$, the CS coupling constant and the quantum potential strength are quantized. Reductions of the model to 1+1 dimensions, leading to modified NLS and DNLS equations with resonance soliton interactions are discussed.