Unified Integer and Fractional Quantum Hall Effects from Boundary-Induced Edge-State Quantization

TL;DR

This paper demonstrates that boundary-induced edge-state quantization within standard quantum mechanics explains both integer and fractional quantum Hall effects by linking bulk Landau levels to edge channel spectra.

Contribution

It introduces a unified microscopic mechanism based on boundary conditions that accounts for the hierarchy of quantum Hall plateaus without extra assumptions.

Findings

Boundary conditions discretize edge states and generate quantized spectra.

The model reproduces integer and fractional Hall sequences.

Weak symmetry breaking stabilizes fractional plateaus at high magnetic fields.

Abstract

Despite the success of Landau-level theory and edge-state transport formalisms, a direct microscopic link between bulk quantization and the observed hierarchy of quantum Hall plateaus has not been established. In particular, no unified microscopic mechanism accounting simultaneously for integer and fractional sequences has been derived within standard quantum mechanics. Here we show that boundary-induced quantization of edge states provides this missing bridge. Starting from the Landau problem in laterally confined two-dimensional electron systems, we demonstrate that the imposition of Dirichlet, Neumann, and mixed (Robin) boundary conditions discretizes both the guiding-center coordinate and the longitudinal momentum of chiral edge states. The resulting boundary-dependent spectra generate families of edge channels with well-defined multiplicities that couple to electronic transport. When incorporated into an edge-state transport description, this boundary quantization reproduces the integer Hall sequence and simultaneously yields a structured hierarchy of fractional filling factors without invoking separate microscopic mechanisms. We further show that a weak Hall-induced parity-breaking contribution reorganizes the low-energy edge spectrum while leaving the bulk Landau levels intact. This controlled symmetry breaking enhances edge-state multiplicities at small Landau indices and stabilizes the fractional plateaus observed at strong magnetic fields. The quantized Hall response thus emerges from the interplay between Landau quantization and boundary-induced guiding-center discretization, which together determine the spectrum and occupation of chiral edge channels. These results establish boundary-induced quantization as the microscopic origin of quantum Hall transport and provide a unified description of both integer and fractional regimes within conventional quantum mechanics.