Tidal Love numbers and the dynamical instability of AdS bubbles

Abstract

In this work, we study non-radial perturbations of AdS bubbles and their tidal Love numbers (TLNs). The odd- and even-parity TLNs are computed up to l=6 in the limit k ∞. The odd-parity TLNs are found to be negative, while the even-parity TLNs are positive for 2s=-1. As l increases, the tidal Love numbers approach zero. The TLNs of the even-parity sector up to order l=41 are also calculated over the entire parameter space of k, from 0 to ∞. We find that in the region where p/σ>0, an increasing number of TLNs become negative as l increases. For l = 41, the highest order we have examined, the TLNs are negative everywhere except in a narrow region very close to the zero of p/σ, which agrees well with the instability criterion in the eikonal limit for self-gravitating membranes proposed by Yang et al.\ [P. R. L. 130, 011402 (2023)].