Interplay between superconductivity and non-Fermi liquid at a quantum-critical point in a metal. III: The γ model and its phase diagram across γ = 1

Abstract

In this paper we continue our analysis of the interplay between the pairing and the non-Fermi liquid behavior in a metal for a set of quantum-critical models with an effective dynamical electron-electron interaction V(m) 1/|m|γ (the γ-model). We analyze both the original model and its extension, in which we introduce an extra parameter N to account for non-equal interactions in the particle-hole and particle-particle channel. In two previous papers(arXiv:2004.13220 and arXiv:2006.02968), we considered the case 0 < γ <1 and argued that (i) at T=0, there exists an infinite discrete set of topologically different gap functions, n (ωm), all with the same spatial symmetry, and (ii) each n evolves with temperature and terminates at a particular Tp,n. In this paper, we analyze how the system behavior changes between γ <1 and γ >1, both at T=0 and a finite T. The limit γ 1 is singular due to infra-red divergence of ∫ d ωm V(m), and the system behavior is highly sensitive to how this limit is taken. We show that for N =1, the divergencies in the gap equation cancel out, and n (ωm) gradually evolve through γ=1 both at T=0 and a finite T. For N ≠ 1, divergent terms do not cancel, and a qualitatively new behavior emerges for γ >1. Namely, the form of n (ωm) changes qualitatively, and the spectrum of condensation energies, Ec,n becomes continuous at T=0. We introduce different extension of the model, which is free from singularities for γ >1.