Adamo Timothy M, Newman Ezra T, Kozameh Carlos
Mathematical Institute, University of Oxford, Oxford, UK.
Department of Physics and Astronomy, University of Pittsburgh, Pittsburgh, USA.
Living Rev Relativ. 2012;15(1):1. doi: 10.12942/lrr-2012-1. Epub 2012 Jan 23.
A priori, there is nothing very special about shear-free or asymptotically shear-free null geodesic congruences. Surprisingly, however, they turn out to possess a large number of fascinating geometric properties and to be closely related, in the context of general relativity, to a variety of physically significant effects. It is the purpose of this paper to try to fully develop these issues. This work starts with a detailed exposition of the theory of shear-free and asymptotically shear-free null geodesic congruences, i.e., congruences with shear that vanishes at future conformal null infinity. A major portion of the exposition lies in the analysis of the space of regular shear-free and asymptotically shear-free null geodesic congruences. This analysis leads to the space of complex analytic curves in an auxiliary four-complex dimensional space, [Formula: see text]-space. They in turn play a dominant role in the applications. The applications center around the problem of extracting interior physical properties of an asymptotically-flat spacetime directly from the asymptotic gravitational (and Maxwell) field itself, in analogy with the determination of total charge by an integral over the Maxwell field at infinity or the identification of the interior mass (and its loss) by (Bondi's) integrals of the Weyl tensor, also at infinity. More specifically, we will see that the asymptotically shear-free congruences lead us to an asymptotic definition of the center-of-mass and its equations of motion. This includes a kinematic meaning, in terms of the center-of-mass motion, for the Bondi three-momentum. In addition, we obtain insights into intrinsic spin and, in general, angular momentum, including an angular-momentum-conservation law with well-defined flux terms. When a Maxwell field is present, the asymptotically shear-free congruences allow us to determine/define at infinity a center-of-charge world line and intrinsic magnetic dipole moment.
先验地,无切变或渐近平直无切变的类光测地线汇并没有什么特别之处。然而,令人惊讶的是,它们具有大量引人入胜的几何性质,并且在广义相对论的背景下与各种具有物理意义的效应密切相关。本文的目的就是试图全面探讨这些问题。这项工作首先详细阐述无切变和渐近平直无切变的类光测地线汇理论,即切变在未来共形类光无穷远处消失的测地线汇。阐述的主要部分在于对正则无切变和渐近平直无切变类光测地线汇空间的分析。这种分析引出了一个辅助的四维复空间([公式:见原文]空间)中的复解析曲线空间。它们反过来在应用中起着主导作用。应用主要围绕直接从渐近引力(和麦克斯韦)场本身提取渐近平直时空内部物理性质的问题,这类似于通过在无穷远处对麦克斯韦场进行积分来确定总电荷,或者通过(邦迪的)外尔张量在无穷远处的积分来确定内部质量(及其损失)。更具体地说,我们将看到渐近平直无切变的测地线汇使我们能够得到质心的渐近定义及其运动方程。这包括邦迪三动量在质心运动方面的运动学意义。此外,我们还深入了解了内禀自旋以及一般的角动量,包括一个具有明确定义的通量项的角动量守恒定律。当存在麦克斯韦场时,渐近平直无切变的测地线汇使我们能够在无穷远处确定/定义电荷中心世界线和内禀磁偶极矩。