基于高度函数的双曲面演化 4D 参考指标

IF 2.1 4区 物理与天体物理 Q2 ASTRONOMY & ASTROPHYSICS
Alex Vañó-Viñuales, Tiago Valente
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引用次数: 0

摘要

超波罗的海切片是达到未来空无穷大的类空间切片。它们的渐近行为不同于传统上用于相对论数值模拟的考奇切片。这项工作使用了球面对称形式上共轭紧凑的爱因斯坦方程的自由演化。构建适用于这一方法的规整条件的方法之一,是通过与时间无关的背景时空度量来构建规整源函数。这种背景参考度量是用高度函数方法设定的,以提供闵科夫斯基时空超球面切片的正确渐近学。本研究的目的是通过量规条件中使用的参考度量,研究高度函数的不同选择对双曲面演化的影响。共探讨了 10 个明考斯基参考度量,确定了它们的一些理想特征。它们包括 3 个双曲面层构造,首次与非线性爱因斯坦方程一起演化。重点是演化的长期数值稳定性,包括小的初始规整扰动。这些结果将与未来的(穿刺型)双曲面演化、三维模拟和考奇与双曲面数据重合的发展等应用相关。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Height-function-based 4D reference metrics for hyperboloidal evolution

Height-function-based 4D reference metrics for hyperboloidal evolution

Hyperboloidal slices are spacelike slices that reach future null infinity. Their asymptotic behaviour is different from Cauchy slices, which are traditionally used in numerical relativity simulations. This work uses free evolution of the formally-singular conformally compactified Einstein equations in spherical symmetry. One way to construct gauge conditions suitable for this approach relies on building the gauge source functions from a time-independent background spacetime metric. This background reference metric is set using the height function approach to provide the correct asymptotics of hyperboloidal slices of Minkowski spacetime. The present objective is to study the effect of different choices of height function on hyperboloidal evolutions via the reference metrics used in the gauge conditions. A total of 10 reference metrics for Minkowski are explored, identifying some of their desired features. They include 3 hyperboloidal layer constructions, evolved with the non-linear Einstein equations for the first time. Focus is put on long-term numerical stability of the evolutions, including small initial gauge perturbations. The results will be relevant for future (puncture-type) hyperboloidal evolutions, 3D simulations and the development of coinciding Cauchy and hyperboloidal data, among other applications.

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来源期刊
General Relativity and Gravitation
General Relativity and Gravitation 物理-天文与天体物理
CiteScore
4.60
自引率
3.60%
发文量
136
审稿时长
3 months
期刊介绍: General Relativity and Gravitation is a journal devoted to all aspects of modern gravitational science, and published under the auspices of the International Society on General Relativity and Gravitation. It welcomes in particular original articles on the following topics of current research: Analytical general relativity, including its interface with geometrical analysis Numerical relativity Theoretical and observational cosmology Relativistic astrophysics Gravitational waves: data analysis, astrophysical sources and detector science Extensions of general relativity Supergravity Gravitational aspects of string theory and its extensions Quantum gravity: canonical approaches, in particular loop quantum gravity, and path integral approaches, in particular spin foams, Regge calculus and dynamical triangulations Quantum field theory in curved spacetime Non-commutative geometry and gravitation Experimental gravity, in particular tests of general relativity The journal publishes articles on all theoretical and experimental aspects of modern general relativity and gravitation, as well as book reviews and historical articles of special interest.
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