A Boundary-Local Mass Cocycle and the Mass of Asymptotically Hyperbolic Manifolds

IF 2.2 1区 物理与天体物理 Q1 PHYSICS, MATHEMATICAL
Andreas Čap, A. Rod Gover
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引用次数: 0

Abstract

We construct a cocycle that, for a given n-manifold, maps a pair of asymptotically locally hyperbolic (ALH) metrics to a tractor-valued \((n-1)\)-form field on the conformal infinity. This requires the metrics to be asymptotically related to a given order that depends on the dimension. It then provides a local geometric quantity on the boundary that is naturally associated to the pair and can be interpreted as a relative energy-momentum density. It is distinguished as a geometric object by its property of being invariant under suitable diffeomorphisms fixing the boundary, and that act on (either) one of the argument metrics. Specialising to the case of an ALH metric h that is suitably asymptotically related to a locally hyperbolic conformally compact metric, we show that the cocycle determines an absolute invariant c(h), which still is local in nature. This tractor-valued \((n-1)\)-form field on the conformal infinity is canonically associated to h (i.e. is not dependent on other choices) and is equivariant under the appropriate diffeomorphisms. Finally specialising further to the case that the boundary is a sphere and that a metric h is asymptotically related to a hyperbolic metric on the interior, we show that the invariant c(h) can be integrated over the boundary. The result pairs with solutions of the KID (Killing initial data) equation to recover the known description of hyperbolic mass integrals of Wang, and Chruściel–Herzlich.

边界局部质量循环和渐近双曲曲面的质量
我们构建了一个循环,对于一个给定的 n-manifold,它可以将一对渐近局部双曲(ALH)度量映射到共形无穷远上的((n-1)\)曳引值形式场。这就要求度量与取决于维度的给定阶渐近相关。然后,它在边界上提供了一个局部几何量,这个几何量自然地与对相关联,可以解释为相对能量-动量密度。作为一个几何对象,它具有在固定边界的适当差分变形作用下不变的特性,并且作用于(任一)参数度量。针对与局部双曲保角紧凑公设有适当渐近关系的 ALH 公设 h 的情况,我们证明了该环决定了一个绝对不变式 c(h),其性质仍然是局部的。共形无限上的((n-1)\)牵引值形式场与 h 具有典型关联(即不依赖于其他选择),并且在适当的差分变形下是等变的。最后,我们将边界进一步特殊化为球面,并且度量 h 与内部的双曲度量渐近相关,证明不变式 c(h) 可以在边界上积分。这一结果与 KID(基林初始数据)方程的解相配合,恢复了王和赫兹利希(Chruściel-Herzlich)对双曲质量积分的已知描述。
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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来源期刊
Communications in Mathematical Physics
Communications in Mathematical Physics 物理-物理:数学物理
CiteScore
4.70
自引率
8.30%
发文量
226
审稿时长
3-6 weeks
期刊介绍: The mission of Communications in Mathematical Physics is to offer a high forum for works which are motivated by the vision and the challenges of modern physics and which at the same time meet the highest mathematical standards.
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