Tidal deformation of a slowly rotating material body. External metric

TL;DR

This paper derives the external metric of a slowly rotating, tidally deformed material body in general relativity, introducing new rotational-tidal Love numbers and analyzing their properties.

Contribution

It provides a detailed perturbative construction of the external metric including rotational-tidal couplings and introduces new gauge-invariant Love numbers.

Findings

Derived the external metric for a slowly rotating, tidally deformed body.

Identified four new rotational-tidal Love numbers.

Showed all Love numbers vanish for black holes.

Abstract

We construct the external metric of a slowly rotating, tidally deformed material body in general relativity. The tidal forces acting on the body are assumed to be weak and to vary slowly with time, and the metric is obtained as a perturbation of a background metric that describes the external geometry of an isolated, slowly rotating body. The tidal environment is generic and characterized by two symmetric-tracefree tidal moments E_{ab} and B_{ab}, and the body is characterized by its mass M, its radius R, and a dimensionless angular-momentum vector \chi^a << 1. The perturbation accounts for all couplings between \chi^a and the tidal moments. The body's gravitational response to the applied tidal field is measured in part by the familiar gravitational Love numbers K^{el}_2 and K^{mag}_2, but we find that the coupling between the body's rotation and the tidal environment requires the introduction of four new quantities, which we designate as rotational-tidal Love numbers. All these Love numbers are gauge invariant in the usual sense of perturbation theory, and all vanish when the body is a black hole.