Eikonal approximation, Finsler structures, and implications for Lorentz-violating photons in weak gravitational fields

TL;DR

This paper explores how Lorentz-violating modifications to photon behavior can be understood through Finsler geometry and eikonal approximation, with implications for gravitational lensing and experimental constraints.

Contribution

It develops a geometric framework linking Lorentz-violating photon sectors to Finsler structures and analyzes their effects in weak gravitational fields.

Findings

Finsler structures describe Lorentz-violating photon propagation.

Light bending measurements can constrain Lorentz violation.

Finsler geometry offers insights into explicit Lorentz violation in gravity.

Abstract

The current article shall contribute to understanding the classical analogue of the minimal photon sector in the Lorentz-violating Standard-Model Extension (SME). It is supposed to complement all studies performed on classical point-particle equivalents of SME fermions. The classical analogue of a photon is not a massive particle being described by a usual equation of motion, but a geometric ray underlying the eikonal equation. The first part of the paper will set up the necessary tools to understand this correspondence for interesting cases of the minimal SME photon sector. In conventional optics the eikonal equation follows from an action principle, which is demonstrated to work in most (but not all) Lorentz-violating cases as well. The integrands of the action functional correspond to Finsler structures, which establishes the connection to Finsler geometry. The second part of the article treats Lorentz-violating light rays in a weak gravitational background by implementing the principle of minimal coupling. Thereby it is shown how Lorentz violation in the photon sector can be constrained by measurements of light bending at massive bodies such as the Sun. The phenomenological studies are based on the currently running ESA mission GAIA and the planned NASA/ESA mission LATOR. The final part of the paper discusses certain aspects of explicit Lorentz violation in gravity based on the setting of Finsler geometry.