Bounds on Tc in the Eliashberg theory of Superconductivity. I: The γ-model

Abstract

Using the recent reformulation for the Eliashberg theory of superconductivity in terms of a classical interacting Bloch spin chain model, rigorous upper and lower bounds on the critical temperature Tc are obtained for the γ model -- a version of Eliashberg theory in which the effective electron-electron interaction is proportional to (g/|ωn-ωm|)γ, where ωn-ωm is the transferred Matsubara frequency, g>0 a reference energy, and γ>0 a parameter. The rigorous lower bounds are based on a variational principle that identifies (Tc/g)γ with the largest (positive) eigenvalue of an explicitly constructed compact, self-adjoint operator G(γ). These lower bounds form an increasing sequence that converges to Tc(g,γ). The upper bound on Tc(g,γ) is based on fixed point theory, proving linear stability of the normal state for T larger than the upper bound on Tc(g,γ).