Laughlin's function on a cylinder: plasma analogy and representation as a quantum polymer
arXiv:0802.2208 · doi:10.1002/pssb.200743516
Abstract
We investigate Laughlin's fractional quantum Hall effect wave function in the cylinder geometry of Laughlin's integer quantum Hall effect argument, at filling factor 1/3. We show that the plasma analogy leads to a periodic density, and that the wave function admits a representation as a ``quantum polymer'', reminiscent of the quantum dimer model by Rokhsar and Kivelson. We explain how the representation can be exploited to compute the normalization and one-particle density in the limit of infinitely many particles.
11 pages, 2 figures