Abstract
The fractional quantum Hall (FQH) states are shown to have q̃ ground-state degeneracy on a Riemann surface of genus g, where q̃ is the ground-state degeneracy in a torus topology. The ground-state degeneracies are directly related to the statistics of the quasiparticles given by θ=p̃π/q̃. The ground-state degeneracy is shown to be invariant against weak but otherwise arbitrary perturbations. Therefore the ground-state degeneracy provides a new quantum number, in addition to the Hall conductance, characterizing different phases of the FQH systems. The phases with different ground-state degeneracies are considered to have different topological orders. For a finite system of size L, the ground-state degeneracy is lifted. The energy splitting is shown to be at most of order . We also show that the Ginzburg-Landau theory of the FQH states (in the low-energy limit) is a dual theory of the U(1) Chern-Simons topological theory.
- Received 17 October 1989
DOI:https://doi.org/10.1103/PhysRevB.41.9377
©1990 American Physical Society