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An extension of the Kohn-Luttinger method for the energy levels of the effective-mass Hamiltonian H= (Pₗ^₂2{m_}+Pₘ^₂2{m_}+Pₙ^₂2{m_}) -e^{2}Kr is made via the Rayleigh-Ritz approach. The method is capable of indefinite extension provided one is prepared to deal with large matrices. The first nine S-like energy levels and the first eighteen P-like energy levels are presented here as a function of the mass ratio =m_{}{m_} for 0<1. The experimental results for the P-like excited states of silicon and germanium can be fitted to within experimental error if one takes the low-temperature static dielectric constant of silicon to be 11. 400. 05, and that of germanium to be 15. 360. 05. The situation concerning donor levels in GaP is discussed briefly.
R. A. Faulkner (Fri,) studied this question.
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