Quantum Hall Effect on the Grassmannians Gr2(CN)

Abstract

Quantum Hall Effects (QHEs) on the complex Grassmann manifolds Gr2(CN) are formulated. We set up the Landau problem in Gr2(CN) and solve it using group theoretical techniques and provide the energy spectrum and the eigenstates in terms of the SU(N) Wigner D-functions for charged particles on Gr2(CN) under the influence of abelian and non-abelian background magnetic monopoles or a combination of these thereof. In particular, for the simplest case of Gr2(C4) we explicitly write down the U(1) background gauge field as well as the single and many-particle eigenstates by introducing the Pl\"ucker coordinates and show by calculating the two-point correlation function that the Lowest Landau Level (LLL) at filling factor =1 forms an incompressible fluid. Our results are in agreement with the previous results in the literature for QHE on CPN and generalize them to all Gr2(CN) in a suitable manner. Finally, we heuristically identify a relation between the U(1) Hall effect on Gr2(C4) and the Hall effect on the odd sphere S5, which is yet to be investigated in detail, by appealing to the already known analogous relations between the Hall effects on CP3 and CP7 and those on the spheres S4 and S8, respectively.