Abstract
We derive an exact formula F(e) which provides a concrete estimate for the total number and angular momentum of gravitons emitted during the nonrelativistic inspiral of two black holes.We show that the function F(e) is a slowly growing monotonic function of the eccentricity 0 ≤ e ≤ 1and F(1) = 1.0128 ⋯.We confirm and extend the results obtained by Page for the function F(e). We also get an exact result for the ratioν (ei ) = 2ħN(Li , ei )/Li where the numerator 2ħN(Li , ei ) is the sum of the spin angular momentum magnitudes of the gravitons emitted and N(Li , ei ) is the total number of gravitons emitted in the gravitational waves during nonrelativistic inspiral from an initial eccentricity ei down to a final eccentricity e = 0 and the denominator Li is the magnitude of the initial orbital angular momentum.If the orbit starts off with unit eccentricity ei = 1,we get the value ν(1) = 1.002 268 666 2 ± 10-10 which confirms the Page's conjecture that the true value of ν(1) will lie between 1.001⋯ and 1.003⋯.We also show that the formula F(e) for gravitons emitted, originally expressed as an infinite series, can be representedby a single function through an integral representation.
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