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Energy extremality in the presence of a black hole | | Rafael D. Sorkin
; Madhavan Varadarajan
; | | Date: |
17 Oct 1995 | | Journal: | Class.Quant.Grav. 13 (1996) 1949-1970 | | Subject: | gr-qc | | Abstract: | We derive the so-called first law of black hole mechanics for variations about stationary black hole solutions to the Einstein--Maxwell equations in the absence of sources. That is, we prove that $delta M=kappadelta A+omegadelta J+VdQ$ where the black hole parameters $M, kappa, A, omega, J, V$ and $Q$ denote mass, surface gravity, horizon area, angular velocity of the horizon, angular momentum, electric potential of the horizon and charge respectively. The unvaried fields are those of a stationary, charged, rotating black hole and the variation is to an arbitrary `nearby’ black hole which is not necessarily stationary. Our approach is 4-dimensional in spirit and uses techniques involving Action variations and Noether operators. We show that the above formula holds on any asymptotically flat spatial 3-slice which extends from an arbitrary cross-section of the (future) horizon to spatial infinity.(Thus, the existence of a bifurcation surface is irrelevant to our demonstration. On the other hand, the derivation assumes without proof that the horizon possesses at least one of the following two (related)properties: ($i$) it cannot be destroyed by arbitrarily small perturbations of the metric and other fields which may be present, ($ii$) the expansion of the null geodesic generators of the perturbed horizon goes to zero in the distant future.) | | Source: | arXiv, gr-qc/9510031 | | Services: | Forum | Review | PDF | Favorites | |
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