P. T. Leung scite author profile

It is well-known that the dominant late time behavior of waves propagating on a Schwarzschild spacetime is a power-law tail; tails for other spacetimes have also been studied. This paper presents a systematic treatment of the tail phenomenon for a broad class of models via a Green's function formalism and establishes the following. (i) The tail is governed by a cut of the frequency Green's functionG(ω) along the − Im ω axis, generalizing the Schwarzschild result. (ii) The ω dependence of the cut is determined by the asymptotic but not the local structure of space. In particular it is independent of the presence of a horizon, and has the same form for the case of a star as well. (iii) Depending on the spatial asymptotics, the late time decay is not necessarily a power law in time. The Schwarzschild case with a power-law tail is exceptional among the class of the potentials having a logarithmic spatial dependence.

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Quasinormal-mode expansion for waves in open systems

Ching

et al. 1998

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Completeness and orthogonality of quasinormal modes in leaky optical cavities

1994

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Late-Time Tail of Wave Propagation on Curved Spacetime

et al. 1995

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P. T. Leung

Wave propagation in gravitational systems: Late time behavior

Quasinormal-mode expansion for waves in open systems

Completeness and orthogonality of quasinormal modes in leaky optical cavities

Late-Time Tail of Wave Propagation on Curved Spacetime

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