Analytical solution for light propagation in Schwarzschild field having an accuracy of 1 micro-arcsecond

Abstract

Numerical integration of the differential equations of light propagation in the Schwarzschild metric shows that in some extreme situations relevant for practical observations (e.g. for Gaia) the well-known standard post-Newtonian formula for the boundary problem has an error up to 16 μas. The aim of this note is to identify the reason for this error and to derive an extended formula accurate at the level of 1 μas as needed e.g. for Gaia. The analytical parametrized post-post-Newtonian solution for light propagation derived by report1 gives the solution for the boundary problem with all analytical terms of order 4 taken into account. Giving an analytical upper estimates of each term we investigate which post-post-Newtonian terms may play a role for an observer in the solar system at the level of 1 μas. We conclude that only one post-post-Newtonian term remains important for this numerical accuracy and derive a simplified analytical solution for the boundary problem for light propagation containing all the terms that are indeed relevant at the level of 1 μas. The derived analytical solution has been verified using the results of a high-accuracy numerical integration of differential equations of light propagation and found to be correct at the level well below 1 μas for arbitrary observer situated within the solar system.