Dieter R. Brill scite author profile

We examine counterparts of the Reissner-Nordström-anti-de Sitter black hole spacetimes in which the two-sphere has been replaced by a surface ⌺ of constant negative or zero curvature. When horizons exist, the spacetimes are black holes with an asymptotically locally anti-de Sitter infinity, but the infinity topology differs from that in the asymptotically Minkowski case, and the horizon topology is not S 2 . Maximal analytic extensions of the solutions are given. The local Hawking temperature is found. When ⌺ is closed, we derive the first law of thermodynamics using a Brown-York-type quasilocal energy at a finite boundary, and we identify the entropy as one-quarter of the horizon area, independent of the horizon topology. The heat capacities with constant charge and constant electrostatic potential are shown to be positive definite. With the boundary pushed to infinity, we consider thermodynamical ensembles that fix the renormalized temperature and either the charge or the electrostatic potential at infinity. Both ensembles turn out to be thermodynamically stable, and dominated by a unique classical solution. ͓S0556-2821͑97͒00818-7͔

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Black holes and wormholes in dimensions

Åminneborg¹,

Bengtsson²,

Brill³

et al. 1998

Class. Quantum Grav.

141

320

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A large variety of spacetimes - including the BTZ black holes - can be obtained by identifying points in (2 + 1)-dimensional anti-de Sitter space by means of a discrete group of isometries. We consider all such spacetimes that can be obtained under a restriction to time-symmetric initial data and one asymptotic region only. The resulting spacetimes are non-eternal black holes with collapsing wormhole topologies. Our approach is geometrical, and we discuss in detail the allowed topologies, the shape of the event horizons, topological censorship and trapped curves.

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Method of the Self-Consistent Field in General Relativity and its Application to the Gravitational Geon

1964

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Dieter R. Brill

Interaction of Neutrinos and Gravitational Fields

Interaction Energy in Geometrostatics

Thermodynamics of(3+1)-dimensional black holes with toroidal or higher genus horizons

Black holes and wormholes in dimensions

Method of the Self-Consistent Field in General Relativity and its Application to the Gravitational Geon

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