Photon surfaces in less symmetric spacetimes

Yasutaka Koga, Takahisa Igata, Keisuke Nakashi
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引用次数: 9

Abstract

We investigate photon surfaces and their stability in a less symmetric spacetime, a general static warped product with a warping function acting on a Riemannian submanifold of codimension two. We find a one-dimensional pseudopotential that gives photon surfaces as its extrema regardless of the spatial symmetry of the submanifold. The maxima and minima correspond to unstable and stable photon surfaces, respectively. It is analogous to the potential giving null circular orbits in a spherically symmetric spacetime. We also see that photon surfaces indeed exist for the spacetimes which are solutions to the Einstein equation. The parameter values for which the photon surfaces exist are specified. As we show finally, the pseudopotential arises due to the separability of the null geodesic equation, and the separability comes from the existence of a Killing tensor in the spacetime. The result leads to the conclusion that photon surfaces may exist even in a less symmetric spacetime if the spacetime admits a Killing tensor.
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不对称时空中的光子表面
我们研究了光子表面及其在非对称时空中的稳定性,这是一个一般的静态翘曲积,翘曲函数作用于余维二的黎曼子流形。我们发现了一个一维伪势,它给出了光子表面作为其极值,而不考虑子流形的空间对称性。最大值和最小值分别对应于不稳定和稳定的光子表面。它类似于在球对称时空中给出零圆轨道的势。我们也看到光子面确实存在于时空中,这是爱因斯坦方程的解。指定了存在光子表面的参数值。正如我们最后所表明的,伪势是由于零测地线方程的可分性而产生的,而可分性来自于时空中存在的杀戮张量。结果表明,即使在一个不对称的时空中,如果时空允许一个杀戮张量,光子表面也可能存在。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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