# Laughlin wavefunction

In condensed matter physics, the **Laughlin wavefunction**^{[1]}^{[2]} is an ansatz, proposed by Robert Laughlin for the ground state of a two-dimensional electron gas placed in a uniform background magnetic field in the presence of a uniform jellium background when the filling factor (Quantum Hall effect) of the lowest Landau level is where is an odd positive integer. It was constructed to explain the observation of the fractional quantum Hall effect, and predicted the existence of additional states as well as quasiparticle excitations with fractional electric charge , both of which were later experimentally observed. Laughlin received one third of the Nobel Prize in Physics in 1998 for this discovery. Being a trial wavefunction, it is not exact, but qualitatively, it reproduces many features of the exact solution and quantitatively, it has very high overlaps with the exact ground state for small systems.

If we ignore the jellium and mutual Coulomb repulsion between the electrons as a zeroth order approximation, we have an infinitely degenerate lowest Landau level (LLL) and with a filling factor of 1/n, we'd expect that all of the electrons would lie in the LLL. Turning on the interactions, we can make the approximation that all of the electrons lie in the LLL. If is the single particle wavefunction of the LLL state with the lowest orbital angular momentum, then the Laughlin ansatz for the multiparticle wavefunction is

where position is denoted by

in (Gaussian units)

and and are coordinates in the xy plane. Here is Planck's constant, is the electron charge, is the total number of particles, and is the magnetic field, which is perpendicular to the xy plane. The subscripts on z identify the particle. In order for the wavefunction to describe fermions, n must be an odd integer. This forces the wavefunction to be antisymmetric under particle interchange. The angular momentum for this state is .

## Energy of interaction for two particlesEdit

The Laughlin wavefunction is the multiparticle wavefunction for quasiparticles. The expectation value of the interaction energy for a pair of quasiparticles is

where the screened potential is (see Coulomb potential between two current loops embedded in a magnetic field)

where is a confluent hypergeometric function and is a Bessel function of the first kind. Here, is the distance between the centers of two current loops, is the magnitude of the electron charge, is the quantum version of the Larmor radius, and is the thickness of the electron gas in the direction of the magnetic field. The angular momenta of the two individual current loops are and where . The inverse screening length is given by (Gaussian units)

where is the cyclotron frequency, and is the area of the electron gas in the xy plane.

The interaction energy evaluates to:

To obtain this result we have made the change of integration variables

and

and noted (see Common integrals in quantum field theory)

The interaction energy has minima for (Figure 1)

and

For these values of the ratio of angular momenta, the energy is plotted in Figure 2 as a function of .

## ReferencesEdit

**^**Original article: Anomalous Quantum Hall Effect: An Incompressible Quantum Fluid with Fractionally Charged Excitations**^**Z. F. Ezewa (2008).*Quantum Hall Effects, Second Edition*. World Scientific. ISBN 978-981-270-032-2. pp. 210-213