Exceptional point and hysteresis in perturbations of Kerr black holes

We employ the isomonodromic method to study linear scalar massive perturbations of Kerr black holes for generic scalar masses $M\mu$ and generic black hole spins $a/M$. We find that the longest-living quasinormal mode and the first overtone coincide for $(M\mu)_c \simeq 0.3704981$ and $(a/M)_c \simeq 0.9994660$. We also show that the longest-living mode and the first overtone change continuously into each other as we vary the parameters around the point of degeneracy, providing evidence for the existence of a geometric phase around an exceptional point. We interpret our findings through a thermodynamic analogy.

Paper https://journals.aps.org/prl/abstract/10.1103/PhysRevLett.133.261401