2D magnetic stability

TL;DR

This paper investigates the stability of a self-interacting almost-bosonic anyon gas with magnetic interactions, revealing supersymmetry properties and explicit vortex solutions that generalize Landau levels, with rigorous mathematical analysis.

Contribution

It extends the analysis of self-dual abelian Chern-Simons-Higgs theory to include magnetic self interactions and explores supersymmetry and vortex solutions in this context.

Findings

Supersymmetry exists at higher magnetic coupling values.

Supersymmetry is broken at lower coupling values.

Explicit vortex solutions form a manifold of solitonic states.

Abstract

This article is a contribution to the proceedings of the 33rd/35th International Colloquium on Group Theoretical Methods in Physics (ICGTMP, Group33/35) held in Cotonou, Benin, July 15-19, 2024. The stability of matter is an old and mathematically difficult problem, relying both on the uncertainty principle of quantum mechanics and on the exclusion principle of quantum statistics. We consider here the stability of the self-interacting almost-bosonic anyon gas, generalizing the Gross-Pitaevskii / nonlinear Schr\"odinger energy functionals to include magnetic self interactions. We show that there is a type of supersymmetry in the model which holds only for higher values of the magnetic coupling but is broken for lower values, and that in the former case supersymmetric ground states exist precisely at even-integer quantized values of the coupling. These states constitute a manifold of explicit solitonic vortex solutions whose densities solve a generalized Liouville equation, and can be regarded as nonlinear generalizations of Landau levels. The reported work is joint with Alireza Ataei and Dinh-Thi Nguyen and makes an earlier analysis of self-dual abelian Chern-Simons-Higgs theory by Jackiw and Pi, Hagen, and others, mathematically rigorous.