The self-energy of the uniform electron gas in the second order of exchange
Abstract
The on-shell self-energy of the homogeneous electron gas in second order of exchange, 2 x= Re 2 x(k F,k F2/2), is given by a certain integral. This integral is treated here in a similar way as Onsager, Mittag, and Stephen [Ann. Physik (Leipzig) 18, 71 (1966)] have obtained their famous analytical expression e2 x=1/6 2- 3ζ(3)(2π)2 (in atomic units) for the correlation energy in second order of exchange. Here it is shown that the result for the corresponding on-shell self-energy is 2 x=e2 x. The off-shell self-energy 2 x(k,ω) correctly yields 2e2 x (the potential component of e2 x) through the Galitskii-Migdal formula. The quantities e2 x and 2 x appear in the high-density limit of the Hugenholtz-van Hove (Luttinger-Ward) theorem.
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