Diagrammatic study of optical excitations in correlated systems

TL;DR

This paper investigates how vertex corrections, especially the {\

Contribution

It introduces a simple method to include vertex corrections like the {\

Findings

Vertex corrections significantly affect optical conductivity in finite-dimensional systems.

The {\

double-ladder extension provides enhanced spectral insights.

Abstract

The optical conductivity contains relevant information on the properties of correlated electron systems. In infinite dimensions, where dynamical mean field theory becomes exact, vertex corrections can be neglected and the conductivity computed from particle-hole bubbles. An interesting question concerns the nature and effect of the most relevant vertex corrections in finite-dimensional systems. A recent numerical study showed that the dominant vertex correction near an ordering instability with wave vector {\pi} comes from a vertical ladder, analogous to the Maki-Thompson diagram. Since the RPA version of this ladder diagram, dubbed {\pi}-ton, can be easily evaluated, this suggests a simple procedure for incorporating antiferromagnetic or charge density wave fluctuations into dynamical mean field estimates of the optical conductivity and related susceptibilities. We implement this procedure for the half-filled Hubbard model, considering the {\pi}-ton and a double-ladder extension of the {\pi}-ton, and reveal the spectral signatures of these vertex corrections.