爱因斯坦引力场方程的广义化

Frédéric Moulin
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引用次数: 0

摘要

黎曼张量是广义相对论的基石,但众所周知,它并没有明确出现在爱因斯坦的引力方程中。这表明后者可能不是最一般的方程。我们在这里根据变分原理进行严格的数学处理,首次提出存在一个广义的 4 指数引力场方程,它线性地包含黎曼曲率张量,因此也包含韦尔张量。我们证明,这个在 $n$ 维中写成的方程包含物质的能动张量和引力场本身的能动张量。这个新的 4 指数方程完全保留在广义相对论的框架内,是我们熟悉的 2 指数爱因斯坦方程的自然概括。由于韦尔张量的存在,我们证明这个方程包含了更多的信息,这完全证明了使用四阶理论的合理性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Generalization of Einstein's gravitational field equations
The Riemann tensor is the cornerstone of general relativity, but as everyone knows it does not appear explicitly in Einstein's equation of gravitation. This suggests that the latter may not be the most general equation. We propose here for the first time, following a rigorous mathematical treatment based on the variational principle, that there exists a generalized 4-index gravitational field equation containing the Riemann curvature tensor linearly, and thus the Weyl tensor as well. We show that this equation, written in $n$ dimensions, contains the energy-momentum tensor for matter and also that of the gravitational field itself. This new 4-index equation remains completely within the framework of general relativity and emerges as a natural generalization of the familiar 2-index Einstein equation. Due to the presence of the Weyl tensor, we show that this equation contains much more information, which fully justifies the use of a fourth-order theory.
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