The field theory of a superconductor with repulsion

TL;DR

This paper develops a formalism using the Hubbard-Stratonovich transformation to analyze how strong Coulomb repulsion influences superconductivity, revealing complex saddle points and exceptional points affecting thermodynamic properties.

Contribution

It introduces a novel approach to incorporate strong repulsion into superconductivity models, extending Eliashberg theory with complex saddle points and fluctuation analysis.

Findings

Complex saddle points extend into the complex plane.

Exceptional points influence the critical field and transition temperature.

The formalism links microscopic interactions to phenomenological superconductivity models.

Abstract

A superconductor emerges as a condensate of electron pairs, which bind despite their strong Coulomb repulsion. Eliashberg's theory elucidates the mechanisms enabling them to overcome this repulsion and predicts the transition temperature and pairing correlations. However, a comprehensive understanding of how repulsion impacts the phenomenology of the resulting superconductor remains elusive. We present a formalism that addresses this challenge by applying the Hubbard-Stratonovich transformation to an interaction including instantaneous repulsion and retarded attraction. We first decompose the interaction into frequency scattering channels and then integrate out the fermions. The resulting bosonic action is complex and the saddle point corresponding to Eliashberg's equations generally extends into the complex plane and away from the physical axis. We numerically determine this saddle point using the gradient descent method, which is particularly well-suited for the case of strong repulsion. We then turn to consider fluctuations around this complex saddle point. The matrix controlling fluctuations about the saddle point is found to be a non-Hermitian symmetric matrix, which generally suffers from exceptional points that are tuned by different parameters. These exceptional points may influence the thermodynamics of the superconductor. For example, within the quadratic approximation the upper critical field sharply peaks at a critical value of the repulsion strength related to an exceptional point appearing at $T_c$. Our work facilitates the mapping between microscopic and phenomenological theories of superconductivity, particularly in the presence of strong repulsion. It has the potential to enhance the accuracy of theoretical predictions for experiments in systems where the pairing mechanism is unknown.