Real modes and null memory contributions in effective-one-body models
Abstract
We introduce a novel approach to describe real-valued m=0 modes from inspiral to merger and ringdown in effective-one-body models, including both oscillatory and null memory contributions. A crucial aspect of the modelization of the oscillatory part is the complexification of the real modes via a Hilbert transform. This procedure allows for an accurate description of the merger-ringdown waveform by applying standard approaches employed for the complex m>0 modes, which include source-driven effects. The physical signal is then recovered by solely considering the real part. We apply this method in the extreme-mass-ratio regime, considering particle-driven linear gravitational perturbations in Schwarzschild and Kerr spacetimes. We then extend our description to spin-aligned, quasi-circular, comparable-mass binaries providing hierarchical fits incorporating the test-mass limit. The post-merger waveform is then matched with an inspiral effective-one-body waveform. By adopting TEOBResumS-GIOTTO as our baseline, we also include the displacement memory in the (2,0) mode through Bondi-Metzner-Sachs balance laws, thus providing a complete effective-one-body model incorporating both oscillatory and null memory effects. The accuracy of this model is validated against the hybrid numerical relativity surrogate NRHybSur3dq8CCE, finding, for the quadrupole of the equal mass nonspinning case, a LIGO noise-weighted mismatch of F = 6· 10-4 at 50 M for the inclination that maximizes the contribution of the (2,0) mode.
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