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Hauptverfasser: Shen, Shui-Fa, Li, Guan-Ru, Kuang, Xiao-Mei, Qian, Wei-Liang, Daghigh, Ramin G., Morey, Jodin C., Green, Michael D., Yue, Rui-Hong
Format: Preprint
Veröffentlicht: 2025
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Online-Zugang:https://arxiv.org/abs/2508.09031
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author Shen, Shui-Fa
Li, Guan-Ru
Kuang, Xiao-Mei
Qian, Wei-Liang
Daghigh, Ramin G.
Morey, Jodin C.
Green, Michael D.
Yue, Rui-Hong
author_facet Shen, Shui-Fa
Li, Guan-Ru
Kuang, Xiao-Mei
Qian, Wei-Liang
Daghigh, Ramin G.
Morey, Jodin C.
Green, Michael D.
Yue, Rui-Hong
contents In this work, we demonstrate that the hyperboloidal foliation technique, applied to the study of black hole quasinormal modes, where the spatial boundary is shifted from spacelike infinity to the future event horizon and null infinity, is effectively equivalent to the continued fraction approach, in which the asymptotic wave function typically diverges at both ends of spatial infinity. Specifically, a given hyperboloidal slicing, corresponding to a particular choice of coordinates, always uniquely determines a scheme for extracting the asymptotic form of the wave function at the spatial boundary. Owing to the mathematical equivalence, it follows that the efficiency and precision observed using the hyperboloidal approach should be attributed, not to avoiding the pathological behavior at the spatial boundaries, but primarily to other factors, such as the use of Chebyshev grids.
format Preprint
id arxiv_https___arxiv_org_abs_2508_09031
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On Hyperboloidal Foliations in the Study of Black Hole Quasinormal Modes
Shen, Shui-Fa
Li, Guan-Ru
Kuang, Xiao-Mei
Qian, Wei-Liang
Daghigh, Ramin G.
Morey, Jodin C.
Green, Michael D.
Yue, Rui-Hong
General Relativity and Quantum Cosmology
In this work, we demonstrate that the hyperboloidal foliation technique, applied to the study of black hole quasinormal modes, where the spatial boundary is shifted from spacelike infinity to the future event horizon and null infinity, is effectively equivalent to the continued fraction approach, in which the asymptotic wave function typically diverges at both ends of spatial infinity. Specifically, a given hyperboloidal slicing, corresponding to a particular choice of coordinates, always uniquely determines a scheme for extracting the asymptotic form of the wave function at the spatial boundary. Owing to the mathematical equivalence, it follows that the efficiency and precision observed using the hyperboloidal approach should be attributed, not to avoiding the pathological behavior at the spatial boundaries, but primarily to other factors, such as the use of Chebyshev grids.
title On Hyperboloidal Foliations in the Study of Black Hole Quasinormal Modes
topic General Relativity and Quantum Cosmology
url https://arxiv.org/abs/2508.09031