Effective mass of composite fermion: a phenomenological fit in with anomalous propagation of surface acoustic wave
arXiv:cond-mat/9911053 · doi:10.1103/PhysRevB.61.2855
Abstract
We calculate the conductivity associated with the anomalous propagation of a surface acoustic wave above a two-dimensional electron gas at $ν=1/2$. Murthy-Shankar's middle representation is adopted and a contribution to the response functions beyond the random phase approximation has been taken into account. We give a phenomenological fit for the effective mass of composite fermion in with the experimental data of the anomalous propagation of surface acoustic wave at $ν=1/2$ and find the phenomenological value of the effective mass is several times larger than the theoretical value $m_{th}^*=6ε/e^2l_{1/2}$ derived from the Hartree-Fock approximation. We compare our phenomenologically fitting composite fermion effective mass with those appeared in the measurements of the activation energy and the Shubnikov-de Haas effect and find that our result is fairly reasonable.
8 pages, 5 figures, the longer version of cond-mat/9801131 with crucial corrections, accepted for publication by PRB