Gauge-Independent Metric Reconstruction of Perturbations of Vacuum Spherically-Symmetric Spacetimes

Michele Lenzi, Carlos F. Sopuerta
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Abstract

Perturbation theory of vacuum spherically-symmetric spacetimes (including the cosmological constant) has greatly contributed to the understanding of black holes, relativistic compact stars and even inhomogeneous cosmological models. The perturbative equations can be decoupled in terms of (gauge-invariant) master functions satisfying $1+1$ wave equations. In this work, building on previous work on the structure of the space of master functions and equations, we study the reconstruction of the metric perturbations in terms of the master functions. To that end, we consider the general situation in which the perturbations are driven by an arbitrary energy-momentum tensor. Then, we perform the metric reconstruction in a completely general perturbative gauge. In doing so, we investigate the role of Darboux transformations and Darboux covariance, responsible for the isospectrality between odd and even parity in the absence of matter sources and also of the physical equivalence between the descriptions based on all the possible master equations. We also show that the metric reconstruction can be carried out in terms of any of the possible master functions and that the expressions admit an explicitly covariant form.
与量纲无关的真空球对称时空扰动的度量重构
真空球对称时空(包括宇宙常数)的扰动理论极大地促进了对黑洞、相对论紧凑星甚至非均质宇宙学模型的理解。扰动方程可以用满足 1+1$ 波方程的(轨规不变)主函数来解耦。在这项工作中,我们以先前关于主函数和方程空间结构的工作为基础,研究了用主函数重构度量扰动的问题。为此,我们考虑了扰动由任意能动张量驱动的一般情况。在此过程中,我们研究了达布变换和达布协方差的作用,它们负责在没有物质源的情况下奇偶奇偶之间的等谱性,以及基于所有可能主方程的描述之间的物理等价性。我们还证明,可以用任何一种可能的主方程来进行计量重建,而且这些表达式都有明确的协变形式。
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