'One-dimensional' theory of the quantum Hall system

We consider the lowest Landau level on a torus as a function of its circumference L-1. When L-1 -> 0, the ground state at general rational filling fraction is a crystal with a gap-a Tao-Thouless state. For filling fractions nu = p/(2pm+1), these states are the limits of Laughlin's or Jain's wavefunctions describing the gapped quantum Hall states when L-1 -> infinity. For the half-filled Landau level, there is a transition to a Fermi sea of non-interacting neutral fermions (dipoles), or rather to a Luttinger liquid modification thereof, at L-1 similar to 5 magnetic lengths. Using exact diagonalization we identify this state as a version of the Rezayi-Read state, and find that it develops continuously into the state that is believed to describe the observed metallic phase as L-1 -> infinity. Furthermore, the effective Landau level structure that emerges within the lowest Landau level is found to be a consequence of the magnetic symmetries.