Exact wave propagation in a spacetime with a cosmic string

Suyama, Teruaki; Tanaka, Takahiro; Takahashi, Ryuichi

doi:10.1103/physrevd.73.024026

Cited by 12 publications

(19 citation statements)

References 57 publications

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“…Nakamura (1998) discussed the diffraction effect on lensing magnifications for inspiraling binaries induced by intervening compact objects. Wave effects in the gravitational lensing of GWs have been discussed linked to several topics (e.g., Baraldo et al 1999;Takahashi & Nakamura 2003;Takahashi 2004;Takahashi et al 2005;Suyama et al 2005Suyama et al , 2006Yoo et al 2007;Sereno et al 2010;Yoo et al 2013;Cao et al 2014). Figure 1 shows a lensing configuration with an observer, a lens, and a source in a nearly straight line.…”

Section: Derivation Of the Arrival Time Differencementioning

confidence: 99%

Arrival Time Differences Between Gravitational Waves and Electromagnetic Signals Due to Gravitational Lensing

Takahashi

2017

ApJ

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In this study, we demonstrate that general relativity predicts arrival time differences between gravitational wave (GW) and electromagnetic (EM) signals caused by the wave effects in gravitational lensing. The GW signals can arrive earlier than the EM signals in some cases if the GW/EM signals have passed through a lens, even if both signals were emitted simultaneously by a source. GW wavelengths are much larger than EM wavelengths; therefore, the propagation of the GWs does not follow the laws of geometrical optics, including the Shapiro time delay, if the lens mass is less than approximately 10 5 M ⊙ (f /Hz) −1 , where f is the GW frequency. The arrival time difference can reach ∼ 0.1 s (f /Hz) −1 if the signals have passed by a lens of mass ∼ 8000M ⊙ (f /Hz) −1 with the impact parameter smaller than the Einstein radius; therefore, it is more prominent for lower GW frequencies. For example, when a distant super massive black hole binary (SMBHB) in a galactic center is lensed by an intervening galaxy, the time lag becomes of the order of 10 days. Future pulsar timing arrays including SKA (the Square Kilometre Array) and X-ray detectors may detect several time lags by measuring the orbital phase differences between the GW/EM signals in the SMBHBs. Gravitational lensing imprints a characteristic modulation on a chirp waveform; therefore, we can deduce whether a measured arrival time lag arises from intrinsic source properties or gravitational lensing. Determination of arrival time differences would be extremely useful in multimessenger observations and tests of general relativity.

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Section: Derivation Of the Arrival Time Differencementioning

confidence: 99%

Arrival Time Differences Between Gravitational Waves and Electromagnetic Signals Due to Gravitational Lensing

Takahashi

2017

ApJ

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“…Next, unlike Ref. [17], we perform the coordinate transformation taking advantage of the flat background (2). To do that, we place the cut line SA strictly perpendicular to the wavefront of the incident wave, as shown in Fig.…”

Section: Wave Equation In Conical Spacementioning

confidence: 99%

“…The images should be undistorted but they may overlap if the split angle, which is proportional to the string tension, is small. In such a case, the wave effects are extremely important as a probe in gravitational lensing [12], that was extensively studied for compact or point-like objects [13], but only a few studies are known for the strings [14][15][16][17][18].…”

Section: Introductionmentioning

confidence: 99%

Wave diffraction by a cosmic string

Fernández-Núñez

Bulashenko

2016

Physics Letters A

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We show that if a cosmic string exists, it may be identified through characteristic diffraction pattern in the energy spectrum of the observed signal. In particular, if the string is on the line of sight, the wave field is shown to fit the Cornu spiral. We suggest a simple procedure, based on Keller's geometrical theory of diffraction, which allows to explain wave effects in conical spacetime of a cosmic string in terms of interference of four characteristic rays. Our results are supposed to be valid for scalar massless waves, including gravitational waves, electromagnetic waves, or even sound in case of condensed matter systems with analogous topological defects.Comment: 5 pages, 6 figures; free access to journal version until September 20, 2016 at http://authors.elsevier.com/a/1TTdX1LUy9BfY

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“…The source must be compact enough to show the clear oscillation behaviour in the spectrum. This fact can be clearly understood by considering the y dependence of the phase in the amplification factor (33). Since τ (y) is roughly approximated by 2y, the period δy for one cycle is given by δy ∼ π/(ωd).…”

Section: Observational Constraintmentioning

confidence: 99%

“…[28,29]. Wave effects in gravitational lensing by the rotating massive object [30], binary system [31], singular isothermal sphere [32] and the cosmic string [33,34] have been considered. In Sec.…”

Section: Introductionmentioning

confidence: 99%

Wave effect in gravitational lensing by the Ellis wormhole

2013

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We propose the use of modulated spectra of astronomical sources due to gravitational lensing to probe Ellis wormholes. The modulation factor due to gravitational lensing by the Ellis wormhole is calculated. Within the geometrical optics approximation, the normal point mass lens and the Ellis wormhole are indistinguishable unless we know the source's unlensed luminosity. This degeneracy is resolved with the significant wave effect in the low frequency domain if we take the deviation from the geometrical optics into account. We can roughly estimate the upper bound for the number density of Ellis wormholes as n 10 −9 AU −3 with throat radius a ∼ 1cm from the existing femto-lensing analysis for compact objects. * Electronic address: yoo@yukawa.kyoto-u.ac.jp 2

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Exact wave propagation in a spacetime with a cosmic string

Cited by 12 publications

References 57 publications

Arrival Time Differences Between Gravitational Waves and Electromagnetic Signals Due to Gravitational Lensing

Arrival Time Differences Between Gravitational Waves and Electromagnetic Signals Due to Gravitational Lensing

Wave diffraction by a cosmic string

Wave effect in gravitational lensing by the Ellis wormhole

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