Close Examination of the Ground-State Casimir-Polder Interaction: Time-Ordered Versus Covariant Formalism and Radiative Corrections

TL;DR

This paper compares time-ordered and covariant formalisms in deriving the ground-state Casimir-Polder interaction, and investigates radiative corrections revealing logarithmic terms in the interaction's higher-order modifications.

Contribution

It provides a detailed comparison of two formalisms for Casimir-Polder interactions and analyzes radiative corrections with new insights into logarithmic contributions.

Findings

Both formalisms yield consistent results for ground-state interactions.

Radiative corrections include logarithmic terms in distance and fine-structure constant.

Higher-order corrections are of order O(α^3).

Abstract

The purpose of this paper is twofold. First, we compare, in detail, the derivation of the Casimir-Polder interaction using time-ordered perturbation theory, to the matching of the scattering amplitude using quantum electrodynamics. In the first case, a total of twelve time-ordered diagrams need to be considered, while in the second case, one encounters only two Feynman diagrams, namely, the ladder and crossed-ladder contributions. For ground-state interactions, we match the contribution of six of the time-ordered diagrams against the corresponding Feynman diagrams, showing the consistency of the two approaches. Second, we also examine the leading radiative correction to the long-range interaction, which is of relative order O(alpha^3). In doing so, we uncover logarithmic terms, in both the interatomic distance as well as the fine-structure constant, in higher-order corrections to the Casimir-Polder interaction.