Quantum Hall Effect on Higher Dimensional Spaces

TL;DR

This paper investigates the quantum Hall effect in higher-dimensional spaces by analyzing particles on the Bergman ball with magnetic fields, deriving energy levels, eigenfunctions, and connecting to complex projective spaces, extending previous results to arbitrary dimensions.

Contribution

It provides a comprehensive analysis of the quantum Hall effect on higher-dimensional Bergman balls and links it to complex projective spaces, generalizing known results to any dimension d.

Findings

Energy spectra and eigenfunctions for particles on Bergman balls

Connection established between Bergman ball and complex projective spaces

Analysis extended to arbitrary dimensions d  3

Abstract

We analysis the quantum Hall effect exhibited by a system of particles moving in a higher dimensional space. This can be done by considering particles on the Bergman ball {\bb{B}_{\rho}^d} of radius \rho in the presence of an external magnetic field B and investigate its basic features. Solving the corresponding Hamiltonian to get the energy levels as well as the eigenfunctions. This can be used to study quantum Hall effect of confined particles in the lowest Landau level where density of particles and two point functions are calculated. We take advantage of the symmetry group of the Hamiltonian on {\bb{B}_{\rho}^d} to make link to the Landau problem analysis on the complex projective spaces CP^d. In the limit \rho\lga\infty, our analysis coincides with that corresponding to particles on the flat geometry {\bb{C}^d}. This task has been done for d=1, 2 and finally for the generic case, i.e. d \geq 3.