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Main Author: Page, Don N.
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2403.10804
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author Page, Don N.
author_facet Page, Don N.
contents If two initially unbound black holes of masses M_1 and M_2, total mass M = M_1 + M_2, reduced mass mu = M_1 M_2/(M_1+M_2), and initial relative velocity v << c(4 mu/M) in otherwise empty space are captured into a bound orbit by emitting gravitational radiation, the inspiral time to coalescence increases monotonically to infinity as the impact parameter b approaches from below the critical impact parameter b_c = [340 pi G^7 M^6 mu/(3 c^5 v^9)]^{1/7} = [(85 pi/384)(4 mu/M)]^{1/7}(2GM/c^2)(v/c)^{-9/7} for capture. Assuming a uniform flux of impinging black holes with b < b_c, the cumulative probability for impact parameters smaller than some value $b$, conditional upon the impact parameter being smaller than $b_c$, is $P = (b/b_c)^2$. Then it is shown that the inspiral time for [Mv^2/(4 mu c^2)]^{2/7} << P < 1 is T = (2 pi GM/v^3) P^{21/4} zeta(3/2,1-P^{7/2}), and closed-form approximate expressions for the inverse function P(T/T_0) with T_0 = 2 pi GM/v^3 are also given.
format Preprint
id arxiv_https___arxiv_org_abs_2403_10804
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Inspiral Time Probability Distribution for Two Black Holes Captured by Emitting Gravitational Radiation
Page, Don N.
General Relativity and Quantum Cosmology
If two initially unbound black holes of masses M_1 and M_2, total mass M = M_1 + M_2, reduced mass mu = M_1 M_2/(M_1+M_2), and initial relative velocity v << c(4 mu/M) in otherwise empty space are captured into a bound orbit by emitting gravitational radiation, the inspiral time to coalescence increases monotonically to infinity as the impact parameter b approaches from below the critical impact parameter b_c = [340 pi G^7 M^6 mu/(3 c^5 v^9)]^{1/7} = [(85 pi/384)(4 mu/M)]^{1/7}(2GM/c^2)(v/c)^{-9/7} for capture. Assuming a uniform flux of impinging black holes with b < b_c, the cumulative probability for impact parameters smaller than some value $b$, conditional upon the impact parameter being smaller than $b_c$, is $P = (b/b_c)^2$. Then it is shown that the inspiral time for [Mv^2/(4 mu c^2)]^{2/7} << P < 1 is T = (2 pi GM/v^3) P^{21/4} zeta(3/2,1-P^{7/2}), and closed-form approximate expressions for the inverse function P(T/T_0) with T_0 = 2 pi GM/v^3 are also given.
title Inspiral Time Probability Distribution for Two Black Holes Captured by Emitting Gravitational Radiation
topic General Relativity and Quantum Cosmology
url https://arxiv.org/abs/2403.10804