Misner-Sharp Mass in $N$-dimensional $f(R)$ Gravity
Abstract
We study the Misner-Sharp mass for the gravity in an -dimensional (n3) spacetime which permits three-type -dimensional maximally symmetric subspace. We obtain the Misner-Sharp mass via two approaches. One is the inverse unified first law method, and the other is the conserved charge method by using a generalized Kodama vector. In the first approach, we assume the unified first still holds in the -dimensional gravity, which requires a quasi-local mass form (We define it as the generalized Misner-Sharp mass). In the second approach, the conserved charge corresponding to the generalized local Kodama vector is the generalized Misner-Sharp mass. The two approaches are equivalent, which are bridged by a constraint. This constraint determines the existence of a well-defined Misner-Sharp mass. As an important special case, we present the explicit form for the static space, and we calculate the Misner-Sharp mass for Clifton-Barrow solution as an example.
Keywords
Cite
@article{arxiv.1406.0577,
title = {Misner-Sharp Mass in $N$-dimensional $f(R)$ Gravity},
author = {Hongsheng Zhang and Yapeng Hu and Xin-Zhou Li},
journal= {arXiv preprint arXiv:1406.0577},
year = {2014}
}
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8 pages