Dynamical Love numbers of black holes: theory and gravitational waveforms (2507.22994v1)

Abstract: In General Relativity, the static tidal Love numbers of black holes vanish identically. Whether this remains true for time-dependent tidal fields -- i.e., in the case of dynamical tidal Love numbers -- is an open question, complicated by subtle issues in the definition and computation of the tidal response at finite frequency. In this work, we compute the dynamical tidal perturbations of a Schwarzschild black hole to quadratic order in the tidal frequency. By employing the Teukolsky formalism in advanced null coordinates, which are regular at the horizon, we obtain a particularly clean perturbative scheme. Furthermore, we introduce a response function based on the full solution of the perturbation equation which does not depend on any arbitrary constant. Our analysis recovers known results for the dissipative response at linear order and the logarithmic running at quadratic order, associated with scale dependence in the effective theory. In addition, we find a finite, nonvanishing conservative correction at second-order in frequency, thereby possibly demonstrating a genuine dynamical deformation of the black hole geometry. We then assess the impact of these dynamical tidal effects on the gravitational-wave phase, which enter at 8th post-Newtonian order, and express the correction in terms of generic $\mathcal{O}(1)$ coefficients, which have to be matched to the perturbative result. Despite their conceptual interest, we argue that such corrections are too small to be observable even with future-generation gravitational wave detectors. Moreover, the corresponding phase shifts are degenerate with unknown point-particle contributions entering at the same post-Newtonian order.