Fourth post-Newtonian effective one-body dynamics
Abstract
The conservative dynamics of gravitationally interacting two-point-mass systems has been recently determined at the fourth post-Newtonian (4PN) approximation [T.Damour, P.Jaranowski, and G.Sch\"afer, Phys. Rev. D 89, 064058 (2014)], and found to be nonlocal in time. We show how to transcribe this dynamics within the effective one-body (EOB) formalism. To achieve this EOB transcription, we develop a new strategy involving the (infinite-)order-reduction of a nonlocal dynamics to an ordinary action-angle Hamiltonian. Our final, equivalent EOB dynamics comprises two (local) radial potentials, and , and a nongeodesic mass-shell contribution given by an infinite series of even powers of the radial momentum . Using an effective action technique, we complete our 4PN-level results by deriving two different, higher-order conservative contributions linked to tail-transported hereditary effects: the 5PN-level EOB logarithmic terms, as well as the 5.5PN-level, half-integral terms. We compare our improved analytical knowledge to previous, numerical gravitational-self-force computation of precession effects.
Cite
@article{arxiv.1502.07245,
title = {Fourth post-Newtonian effective one-body dynamics},
author = {Thibault Damour and Piotr Jaranowski and Gerhard Schäfer},
journal= {arXiv preprint arXiv:1502.07245},
year = {2015}
}
Comments
Minor amendments added; misprints removed; identical with published version; 18 pages, 1 figure