Eliashberg theory in the weak-coupling limit: results on the real frequency axis

Abstract

We formulate and solve the Eliashberg equations on the imaginary frequency axis at temperatures below Tc in the weak-coupling limit. We find an excellent scaling at all temperatures, for a given coupling strength, and the normalized order parameter exhibits a BCS-like temperature dependence. The hybrid real-imaginary axis equations are also solved to obtain numerically exact analytic continuations from the imaginary frequency axis to the real frequency axis. This provides a determination of the gap edge, which, in the weak-coupling limit, is identical to the order parameter from the imaginary axis. The analytical result for the zero-temperature gap edge deviates from the BCS result by a factor of 1/e, which was also obtained for the transition temperature Tc. We show that the normalized gap function on both the real and imaginary frequency axes, for an electron-phonon Einstein spectrum (δ-function) of a given strength, is a universal function of frequency, independent of temperature. The 1/e correction is a result of this non-trivial frequency dependence in the gap function. This modification, in the gap edge and in Tc, serves to preserve various dimensionless ratios to their BCS values.